{"id":4564,"date":"2021-06-27T16:57:50","date_gmt":"2021-06-27T23:57:50","guid":{"rendered":"https:\/\/gurumuda.net\/physics\/?p=4564"},"modified":"2021-06-27T16:57:50","modified_gmt":"2021-06-27T23:57:50","slug":"addition-of-vectors","status":"publish","type":"post","link":"https:\/\/gurumuda.net\/physics\/addition-of-vectors.htm","title":{"rendered":"Addition of Vectors","gt_translate_keys":[{"key":"rendered","format":"text"}]},"content":{"rendered":"<h3 align=\"justify\">Article about the Addition of Vectors<\/h3>\n<h3 class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>1. Quantities of vector and scalar<\/b><\/span><\/span><\/h3>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">In addition to the fundamental and derived quantities, physical quantities can still be divided into two other types, namely scalar quantities and vector quantities. Quantities such as mass, distance, time and volume, are scalar quantities, quantities that only have magnitude but have no direction. Whereas magnitudes such as displacement, velocity, acceleration, and force are vector quantities, quantities that have magnitude and also have direction.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>a. <\/b><\/span><\/span><em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>Difference<\/b><\/span><\/span><\/em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b> between s<\/b><\/span><\/span><em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>calar and vector quantity<\/b><\/span><\/span><\/em><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">If you say the mass of a ball is 400 grams, this statement is enough for you to know the mass of the ball. You don&#8217;t need direction to find out the mass of the ball. Likewise with time, temperature, volume, density, etc. There are several physical quantities that cannot be expressed in magnitude only. If you say a child moves as far as 100 meters, then this statement is not enough. You might ask, where did he move? Is it north, south, east, or west? Likewise, if you say that you push the table with a force of 200 N.<\/span><\/span><!--more--><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Where do you drive? Well, such quantities are called vector quantities, which require an explanation of the magnitude and direction. Examples of vector quantities are displacement, acceleration, impulse, <a href=\"https:\/\/gurumuda.net\/physics\/momentum-problems-and-solutions.htm\">momentum<\/a>, etc. You can understand it more clearly when studying subjects related to that quantities.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b><img loading=\"lazy\" decoding=\"async\" class=\"alignright size-full wp-image-4565\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-1.png\" alt=\"Addition of Vectors 1\" width=\"229\" height=\"114\" \/>b. Draw a vector<\/b><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Vector is indicated by an arrow. The arrow is always drawn so that it points in the direction of the vector. The length of the arrow is described as the magnitude of the vector. For example, in the figure of a vector of force (F) with a magnitude of 2 N whose direction is towards the northeast or 45<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>c. R<\/b><\/span><\/span><em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>ules<\/b><\/span><\/span><\/em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b> for w<\/b><\/span><\/span><em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>riting quantities of vector<\/b><\/span><\/span><\/em><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">In writing a vector, if you use handwriting, the symbol of a vector is generally written in italics using uppercase letters, and above it needs to be added with an arrow. For printed books, vector symbols are written in uppercase letters in bold, for example, <\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>F<\/b><\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">. For the magnitude of the vector, if we use handwriting then the magnitude of a vector is written, for example, |F|. For printed books, the magnitude of a vector is written in italics, for example, <\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><i>F<\/i><\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">.<\/span><\/span><\/p>\n<h3 class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>2. Addition of vectors\u2014graphical methods<\/b><\/span><\/span><\/h3>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">There are several ways to add vectors graphically, including the Tail-to-tip method and the parallelogram method.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>a. Tail-to-tip method of adding vectors<\/b><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Vector A and B are known. Vector A = 3 cm coincides with the x-axis (towards the east). Vector B = 2 cm forms an angle of 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> to the x-axis (towards the northeast). Add A and B graphically using the Tail-to-tip method. a) R = A + B b) R = A &#8211; B<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4566\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-2.png\" alt=\"Addition of Vectors 2\" width=\"229\" height=\"66\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-medium wp-image-4567\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-3-300x81.png\" alt=\"Addition of Vectors 3\" width=\"300\" height=\"81\" srcset=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-3-300x81.png 300w, https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-3.png 370w\" sizes=\"auto, (max-width: 300px) 100vw, 300px\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The magnitude of the resultant vector (R) is measured using a ruler. The direction of the resultant vector is measured using a protractor.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Known vectors A, B, and C. Vector A = 3 cm coincides with the x-axis (towards the east). Vector B = 2 cm forms an angle of 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> to the x-axis (towards the northeast). Vector C = 1 cm forms an angle of 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> to the x-axis (towards the northeast). Add A, B, and C graphically using the Tail-to-tip method. <\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">a) R = A + B + C <\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">b) R = A &#8211; B &#8211; C<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4568\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-4.png\" alt=\"Addition of Vectors 4\" width=\"133\" height=\"156\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-medium wp-image-4569\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-5-300x101.png\" alt=\"Addition of Vectors 5\" width=\"300\" height=\"101\" srcset=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-5-300x101.png 300w, https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-5.png 399w\" sizes=\"auto, (max-width: 300px) 100vw, 300px\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The resultant vector (R) is measured using a ruler. The direction of the resultant vector is measured using a protractor.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>b. Parallelogram method<\/b><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Known vectors A, B, and C. Vector A = 3 cm coincides with the x-axis (towards the east). Vector B = 2 cm forms an angle of 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> to the x-axis (towards the northeast). Vector C = 1 cm forms an angle of 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o <\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">to the x-axis (towards the northeast). Add A, B, and C graphically using a parallelogram. <\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">a) R = A + B <\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">b) R = A &#8211; B <\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">c) R = A + B + C<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">d) R = A &#8211; B &#8211; C<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4570\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-6.png\" alt=\"Addition of Vectors 6\" width=\"133\" height=\"160\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4571\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-7.png\" alt=\"Addition of Vectors 7\" width=\"251\" height=\"253\" srcset=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-7.png 251w, https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/sites\/28\/2018\/10\/Addition-of-Vectors-7-150x150.png 150w\" sizes=\"auto, (max-width: 251px) 100vw, 251px\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4572\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-8.png\" alt=\"Addition of Vectors 8\" width=\"220\" height=\"254\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The resultant vector (R) is measured using a ruler. The direction of the resultant vector is measured using a protractor.<\/span><\/span><\/p>\n<h3 class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>3. Addition of vectors &#8211; a<\/b><\/span><\/span><em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>nalytical<\/b><\/span><\/span><\/em><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b> method<\/b><\/span><\/span><\/h3>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Determining the magnitude and direction of the resultant vector with the graphical method is one approach. The accuracy of the results depends on your accuracy and accuracy in drawing and reading the scale. The magnitude and direction of the resultant vector are more precisely obtained through mathematical calculations.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>a. Calculating the sum of 2 vectors using the cosine rule<\/b><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The formula for determining the magnitude of the resultant vector:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4573\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-9a.png\" alt=\"Addition of Vectors 9a\" width=\"284\" height=\"32\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The formula for determining the direction of the resultant vector:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4574\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-9b.png\" alt=\"Addition of Vectors 9b\" width=\"284\" height=\"49\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">C = resultant vector<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">A = vector 1<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">B = vector 2<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">cos \u2220(A, B) = angle formed by vectors A and B<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Sample problem 1:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">1<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 2 N forms an angle of 30 about x-axis, F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 3 N forms an angle of 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about x-axis, \u03b8 = 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">.<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4575\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-10.png\" alt=\"Addition of Vectors 10\" width=\"209\" height=\"48\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4576\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-11.png\" alt=\"Addition of Vectors 11\" width=\"126\" height=\"140\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Sample problem 2:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">1<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 2 N coincides with the x-axis, F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2 <\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= 3 N forms an angle of 90<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about x-axis, \u03b8 = 90<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">.<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4577\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-12.png\" alt=\"Addition of Vectors 12\" width=\"200\" height=\"54\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4578\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-13.png\" alt=\"Addition of Vectors 13\" width=\"117\" height=\"144\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><b>b. Adding vectors by components<\/b><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Review a vector F that forms a certain angle about the x-axis, as shown in the figure below. F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">x<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">y<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> are component vectors of vector F.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The magnitude of the component vector is determined using the formula:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">x<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F cos \u03b8<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">y<\/span><\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F sin \u03b8<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4579\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-14.png\" alt=\"Addition of Vectors 14\" width=\"133\" height=\"134\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Review the two vectors F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> which form a certain angle about the x-axis, as shown in the figure below. F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> are components of vector F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">, so F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> are components of vector F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">.<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The component vector is determined using the formula:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> cos \u03b8<img loading=\"lazy\" decoding=\"async\" class=\"alignright size-full wp-image-4580\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-15.png\" alt=\"Addition of Vectors 15\" width=\"188\" height=\"159\" \/><\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> sin \u03b8<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2 <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">cos \u03b8<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> sin \u03b8<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Adding the component vectors:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">x <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2y<\/span><\/sub><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The resultant vector is determined using the formula:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4581\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-16a.png\" alt=\"Addition of Vectors 16a\" width=\"108\" height=\"33\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The direction of the resultant vector is determined using the formula:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4582\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-16b.png\" alt=\"Addition of Vectors 16b\" width=\"110\" height=\"46\" \/><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4583\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-17.png\" alt=\"Addition of Vectors 17\" width=\"184\" height=\"154\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Sample problem 1:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Determine the components of vector F whose magnitude is 20 N and form an angle of 30<sup>o<\/sup> about the x-axis.<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4584\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-18.png\" alt=\"Addition of Vectors 18\" width=\"120\" height=\"86\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><sub>x<\/sub> <\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= (20 N)(cos 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 17 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">y <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= (20 N)(sin 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 10 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Sample problem 2:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<sub>1<\/sub> = 20 N forms an angle of 30<sup>o<\/sup> about the x-axis and F<sub>2<\/sub> = 15 N forms an angle of 180o about the x-axis. Determine the magnitude and direction of the resultant vector.<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4585\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-19.png\" alt=\"Addition of Vectors 19\" width=\"157\" height=\"96\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (20 N)(cos 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 17 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1 <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= &#8211; 15 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (20 N)(sin 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 10 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2y <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= 0<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Adding the component vectors:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> &#8211; F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 17 N \u2013 15 N = 2 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 10 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">The resultant vector:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2 <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= F<sub>x<\/sub><\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + F<sub>y<\/sub><\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 2<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + 10<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 4 + 100 = 104<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F = 10.2 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Direction of the resultant vector:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4586\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-20.png\" alt=\"Addition of Vectors 20\" width=\"98\" height=\"52\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">\u03b8 = tan<\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">\u221215<\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 78.7<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Sample problem 3 :<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">, F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2,<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> are 20 N, 30 N and 40 N. F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1 <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">forms an angle of 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis, F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> forms an angle of 150<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis, and F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> forms an angle of 315<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis. Determine the magnitude and direction of the resultant vector.<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4587\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-21.png\" alt=\"Addition of Vectors 21\" width=\"187\" height=\"185\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><sub>1x<\/sub> <\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= (20 N)(cos 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 10 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (20 N)(sin 60<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 17 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (30 N)(cos 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = -26 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (30 N)(sin 30<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 15 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (40 N)(cos 45<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = 28 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = (40 N)(sin 45<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">) = -28 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Adding the component vector:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">x <\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> &#8211; F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3x<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 10 N \u2013 26 N + 28 N = 12 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"><sub>y<\/sub> <\/span><\/span><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">1y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">2y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> &#8211; F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">3y<\/span><\/sub><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 17 N + 15 N \u2013 28 N = 4 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Resultant vector:<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2 <\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">x<\/span><\/sub><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2 <\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">+ F<\/span><\/span><sub><span style=\"font-family: Times new roman, serif\">y<\/span><\/sub><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2 <\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">= 12<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> + 4<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">2<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> = 144 + 16 = 160<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">F = 13 N<\/span><\/span><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">Direction of the resultant vector:<\/span><\/span><\/p>\n<p align=\"justify\"><img loading=\"lazy\" decoding=\"async\" class=\"aligncenter size-full wp-image-4588\" src=\"https:\/\/gurumuda.net\/physics\/wp-content\/uploads\/2018\/10\/Addition-of-Vectors-22.png\" alt=\"Addition of Vectors 22\" width=\"100\" height=\"47\" \/><\/p>\n<p class=\"western\" align=\"justify\"><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">\u03b8 = tan<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">\u22121 <\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">0.3 = 17<\/span><\/span><sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\">o<\/span><\/span><\/sup><span style=\"font-family: Times new roman, serif\"><span style=\"font-size: medium\"> about the x-axis<\/span><\/span><\/p>\n<p align=\"justify\">\n","protected":false,"gt_translate_keys":[{"key":"rendered","format":"html"}]},"excerpt":{"rendered":"<p>Article about the Addition of Vectors 1. Quantities of vector and scalar In addition to the fundamental and derived quantities, physical quantities can still be divided into two other types, namely scalar quantities and vector quantities. Quantities such as mass, distance, time and volume, are scalar quantities, quantities that only have magnitude but have no &#8230; <a title=\"Addition of Vectors\" class=\"read-more\" href=\"https:\/\/gurumuda.net\/physics\/addition-of-vectors.htm\" aria-label=\"Read more about Addition of Vectors\">Read more<\/a><\/p>\n","protected":false,"gt_translate_keys":[{"key":"rendered","format":"html"}]},"author":1,"featured_media":0,"comment_status":"open","ping_status":"closed","sticky":false,"template":"","format":"standard","meta":{"_seopress_titles_title":"","_seopress_titles_desc":"Article about the Addition of Vectors Quantities of vector and scalar, Addition of vectors - graphical methods, Addition of vectors - analytical method","_seopress_robots_index":"","_seopress_robots_follow":"","_seopress_robots_imageindex":"","_seopress_robots_snippet":"","_seopress_robots_primary_cat":"","_seopress_robots_breadcrumbs":"","_seopress_robots_freeze_modified_date":"","_seopress_robots_custom_modified_date":"","_seopress_robots_canonical":"","_seopress_social_fb_title":"","_seopress_social_fb_desc":"","_seopress_social_fb_img":"","_seopress_social_fb_img_attachment_id":0,"_seopress_social_fb_img_width":0,"_seopress_social_fb_img_height":0,"_seopress_social_twitter_title":"","_seopress_social_twitter_desc":"","_seopress_social_twitter_img":"","_seopress_social_twitter_img_attachment_id":0,"_seopress_social_twitter_img_width":0,"_seopress_social_twitter_img_height":0,"_seopress_redirections_value":"","_seopress_redirections_enabled":"","_seopress_redirections_enabled_regex":"","_seopress_redirections_logged_status":"","_seopress_redirections_param":"","_seopress_redirections_type":0,"_seopress_analysis_target_kw":"Addition of Vectors","_seopress_news_disabled":"","_seopress_video_disabled":"","_seopress_video":[],"_seopress_pro_schemas_manual":[],"_seopress_pro_rich_snippets_disable_all":"","_seopress_pro_rich_snippets_disable":[],"_seopress_pro_schemas":[],"footnotes":""},"categories":[2],"tags":[],"class_list":["post-4564","post","type-post","status-publish","format-standard","hentry","category-basic-physics-tutorials"],"gt_translate_keys":[{"key":"link","format":"url"}],"_links":{"self":[{"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/posts\/4564","targetHints":{"allow":["GET"]}}],"collection":[{"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/users\/1"}],"replies":[{"embeddable":true,"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/comments?post=4564"}],"version-history":[{"count":0,"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/posts\/4564\/revisions"}],"wp:attachment":[{"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/media?parent=4564"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/categories?post=4564"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/gurumuda.net\/physics\/wp-json\/wp\/v2\/tags?post=4564"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}