Finding the Component Form of aVector In Exercises 65–70, find thecomponent form of v given its magnitude andthe angle it makes with the positive x-axis.Then sketch v.Magnitude Angle65. ,v, = 3 θ = 0°66. ,v, = 4√3 θ = 90°67. ,v, = 72 θ = 150°68. ,v, = 2√3 θ = 45°69. ,v, = 3 v in the direction 3i + 4j70. ,v, = 2 v in the direction i + 3j
Finding the Component Form of aVector In Exercises 65–70, find thecomponent form of v given its magnitude andthe angle it makes with the positive x-axis.Then sketch v.Magnitude Angle65. ,v, = 3 θ = 0°66. ,v, = 4√3 θ = 90°67. ,v, = 72 θ = 150°68. ,v, = 2√3 θ = 45°69. ,v, = 3 v in the direction 3i + 4j70. ,v, = 2 v in the direction i + 3j
Finding the Component Form of aVector In Exercises 65–70, find thecomponent form of v given its magnitude andthe angle it makes with the positive x-axis.Then sketch v.Magnitude Angle65. ,v, = 3 θ = 0°66. ,v, = 4√3 θ = 90°67. ,v, = 72 θ = 150°68. ,v, = 2√3 θ = 45°69. ,v, = 3 v in the direction 3i + 4j70. ,v, = 2 v in the direction i + 3j
Finding the Component Form of a Vector In Exercises 65–70, find the component form of v given its magnitude and the angle it makes with the positive x-axis. Then sketch v. Magnitude Angle 65. ,v, = 3 θ = 0° 66. ,v, = 4√3 θ = 90° 67. ,v, = 7 2 θ = 150° 68. ,v, = 2√3 θ = 45° 69. ,v, = 3 v in the direction 3i + 4j 70. ,v, = 2 v in the direction i + 3j
Figure in plane geometry formed by two rays or lines that share a common endpoint, called the vertex. The angle is measured in degrees using a protractor. The different types of angles are acute, obtuse, right, straight, and reflex.
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