Express the vector v as the sum of a vector parallel to b and a vector orthogonal to b. a v = 2 i − 4 j , b = i + j b v = 3 i + j − 2k , b = 2 i − k c v = 4 i − 2 j + 6k , b = − 2 i + j − 3k
Express the vector v as the sum of a vector parallel to b and a vector orthogonal to b. a v = 2 i − 4 j , b = i + j b v = 3 i + j − 2k , b = 2 i − k c v = 4 i − 2 j + 6k , b = − 2 i + j − 3k
Express the vector v as the sum of a vector parallel to b and a vector orthogonal to b.
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Quantities that have magnitude and direction but not position. Some examples of vectors are velocity, displacement, acceleration, and force. They are sometimes called Euclidean or spatial vectors.
Find the equations of the traces in the coordinate planes and sketch them
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Write v as the sum of two vector components if v = i + 3j and w = 2i+j.
O v = (-2i+2j) + (i + j)
O v = (-i+j) + (-2i+2j)
O v= (-i+2j) + (i + 2j)
O v= (2i+j) + (-i + 2j)
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Write the vector a=i−4j as the sum of a vector parallel to b=j+k, and a vector perpendicular to b.
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