-4 3 Let TA : R R be matrix multiplication by A = 3 1 4 -1 Find the magnitude of the image of the scalar vector under this matrix transformation where (x, y, z) = (1 – t)(2, -3, 1) + t(4, 1, 2) for 0

-4<br>3<br>Let TA : R R be matrix multiplication by A =<br>3<br>1<br>4<br>-1<br>Find the magnitude of the image of the scalar vector under this matrix transformation where<br>(x, y, z) = (1 – t)(2, -3, 1) + t(4, 1, 2) for 0 < t < 1<br>Note:<br>If x = (x0, yo-, zo) + t(x1, yı, z1), then (xo, yo, zo) is called a scalar vector.<br>%3D<br>none of these above<br>12/3<br>O 113<br>O 13/3<br>O 14V3<br>

Extracted text: -4 3 Let TA : R R be matrix multiplication by A = 3 1 4 -1 Find the magnitude of the image of the scalar vector under this matrix transformation where (x, y, z) = (1 – t)(2, -3, 1) + t(4, 1, 2) for 0 < t="">< 1="" note:="" if="" x="(x0," yo-,="" zo)="" +="" t(x1,="" yı,="" z1),="" then="" (xo,="" yo,="" zo)="" is="" called="" a="" scalar="" vector.="" %3d="" none="" of="" these="" above="" 12/3="" o="" 113="" o="" 13/3="" o="">

Jun 04, 2022

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-4 3 Let TA : R R be matrix multiplication by A = 3 1 4 -1 Find the magnitude of the image of the scalar vector under this matrix transformation where (x, y, z) = (1 – t)(2, -3, 1) + t(4, 1, 2) for 0

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