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Addition & Subtraction of Cartesian Vectors | Engineering Mechanics - Civil Engineering (CE) PDF Download

Addition of Forces. The concept of force resultant can be applied to a concurrent force system which is written in the Cartesian vector form.  If P is the resultant of F1, F2, F3, … hence

PFi

=  (F1x + F2x + …)i + (F1y + F2y + …)j + (F1z + F2z + …)k

= ΣFixi + ΣFiyj + ΣFizk          (2.5)

whereΣFix, ΣFiy, and ΣFiz are the sums of the magnitudes of the forces in the corresponding direction.

2.8 RESOLUTION OF FORCES

Any force can be resolved into its components. There are a number of methods that can be used to resolve a force. The method use depends on the problem at hand.  The different methods are described below.

2.8.1. Parallelogram Law

A force acting at any point can be resolved into components that act in two desired directions through the parallelogram law.  Force F in Figure 2.12(a), for example, can be replaced by two components acting in directions 1 and 2.  The resolution is implemented by drawing a parallelogram with F as the diagonal and its two non-parallel sides along directions 1 and 2,

Addition & Subtraction of Cartesian Vectors | Engineering Mechanics - Civil Engineering (CE)

Note that resolution is the reverse process of adding two forces into their resultant.  Hence the resolution involves six quantities, i.e. the magnitude and direction of F and of the two components, where two of them can be determined when the other four are known. 

Rectangular components.  When force F is resolved into perpendicular directions, we obtain the rectangular components.  This is shown in Figure 2.13 for a 2D case, where the respective perpendicular directions are represented by the x-axis and the y-axis.  In this case, we get

Fx = F cos θ

 Fy = F sin θ

where  θ = tan-1 (Fy/Fx)

Addition Of Forces.   Forces can be added by using their components, normally the rectangular components in the Cartesian directions. Consider forces F1 and F2 that are concurrent at O being added using the force polygon, Figure 2.14(a).  The resultant P is

P = F1 + F

The document Addition & Subtraction of Cartesian Vectors | Engineering Mechanics - Civil Engineering (CE) is a part of the Civil Engineering (CE) Course Engineering Mechanics.
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FAQs on Addition & Subtraction of Cartesian Vectors - Engineering Mechanics - Civil Engineering (CE)

1. What are Cartesian vectors?
Ans. Cartesian vectors are a type of vector that represents a quantity in three-dimensional space using the Cartesian coordinate system. They consist of three components, usually denoted as (x, y, z), where each component represents the magnitude of the vector along the x, y, and z axes, respectively.
2. How do you perform addition of Cartesian vectors?
Ans. To add Cartesian vectors, you simply add the corresponding components of the vectors. For example, if you have two vectors A = (2, 3, 4) and B = (1, -2, 5), the sum of these vectors would be A + B = (2 + 1, 3 + (-2), 4 + 5) = (3, 1, 9).
3. How do you perform subtraction of Cartesian vectors?
Ans. Similar to addition, to subtract Cartesian vectors, you subtract the corresponding components of the vectors. For example, if you have two vectors A = (2, 3, 4) and B = (1, -2, 5), the difference of these vectors would be A - B = (2 - 1, 3 - (-2), 4 - 5) = (1, 5, -1).
4. What is the result of adding a vector to its negative vector?
Ans. The result of adding a vector to its negative vector is always the zero vector. In other words, if you have a vector V, then V + (-V) = (0, 0, 0). This property is important in vector algebra and is known as the additive inverse property.
5. Can you add or subtract vectors with different dimensions?
Ans. No, you cannot add or subtract vectors with different dimensions. In order to perform vector addition or subtraction, the vectors must have the same number of components. For example, you cannot add a two-dimensional vector (x, y) to a three-dimensional vector (x, y, z). The dimensions of the vectors must match for addition or subtraction to be valid.
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