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24 April, 15:05

Given c = (2.4,0.45) and d = (7,-4) find the direction of 5c+4d

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  1. 24 April, 17:14
    0
    The direction of 5c + 4d is approximately 19.0° clockwise with

    the positive part of x-axis

    Step-by-step explanation:

    * Lets talk about the direction of a vector

    - If the vector is (x, y), then

    # Its magnitude is √ (x² + y²)

    # Its direction is tan^-1 (y/x)

    - The direction is the angle between the positive part of x-axis and

    the vector

    * Lets solve the problem

    ∵ c = (2.4, 0.45) and d = (7, - 4)

    - To find 5c + 4d, multiply the two coordinates of c by 5 and the two

    coordinates of d by 4

    # Multiply c by 5

    ∴ 5c = [5 (2.4), 5 (0.45) ]

    ∴ 5c = (12, 2.25)

    # Multiply d by 4

    ∴ 4d = [4 (7), 4 (-4) ]

    ∴ 4d = (28, - 16)

    - Lets add 5c and 4d

    ∴ 5c + 4d = (12, 2.25) + (28, - 16)

    ∴ 5c + 4d = [ (12 + 28), (2.25 + - 16) ]

    ∴ 5c + 4d = (40, - 13.75)

    - The vector is in the 4th quadrant because the x-coordinate is

    positive and the y-coordinate is negative

    * Find the direction of 5c + 4d

    ∵ The direction is tan^-1 (y/x)

    ∴ The direction is tan^-1 (-13.75/40) = - 18.97°

    * The direction of 5c + 4d is approximately 19.0° clockwise with

    the positive part of x-axis
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