Answer:
(7.93, 6.09).
Explanation:
The vector v starts at the origin and ends in Quadrant II. We are given that v makes an angle of 5/6 with the positive x-axis and its magnitude (length) is 10.
To find v in component form, we can break down the vector into its x and y components. The x-component represents the horizontal displacement, while the y-component represents the vertical displacement.
Since the angle is measured from the positive x-axis, we can use trigonometric functions to find the x and y components of the vector.
The x-component can be found using cosine function:
x = |v| * cos(angle)
Substituting the given values:
x = 10 * cos(5/6)
To find the y-component, we use the sine function:
y = |v| * sin(angle)
Substituting the given values:
y = 10 * sin(5/6)
Now we have the x and y components of the vector v. The component form of v is (x, y).
To simplify further, we can use a calculator to find the values of x and y:
x ≈ 10 * 0.793 = 7.93
y ≈ 10 * 0.609 = 6.09
Therefore, v in component form is approximately (7.93, 6.09).