Let E= (e1,e2,e3} be the standard basis for R° and B= (b 1,b2,b3} be basis for vector spaces V, and Let T:R3 → V be a linear transformation with the property that T(x1,X2,X3) = (x2 - X3)b1+(x1+ x3)b,...

Let E= (e1,e2,e3} be the standard basis for R° and B= (b 1,b2,b3} be<br>basis for vector spaces V, and Let T:R3 → V be a linear transformation<br>with the property that<br>T(x1,X2,X3) = (x2 - X3)b1+(x1+ x3)b, +(x2- x1)b3<br>The matrix for T relative to Band E =<br>1 1 -1<br>0 0 1<br>-1 1 0<br>a.<br>0 1<br>1 0 -1<br>-1 1 0<br>-<br>b.<br>1<br>1<br>-1 1<br>2<br>-1 -1 1<br>- 1<br>-1<br>C.<br>-1<br>0 1 -1<br>1 0 1<br>d.<br>-1 1 0<br>

Extracted text: Let E= (e1,e2,e3} be the standard basis for R° and B= (b 1,b2,b3} be basis for vector spaces V, and Let T:R3 → V be a linear transformation with the property that T(x1,X2,X3) = (x2 - X3)b1+(x1+ x3)b, +(x2- x1)b3 The matrix for T relative to Band E = 1 1 -1 0 0 1 -1 1 0 a. 0 1 1 0 -1 -1 1 0 - b. 1 1 -1 1 2 -1 -1 1 - 1 -1 C. -1 0 1 -1 1 0 1 d. -1 1 0

Jun 04, 2022

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Let E= (e1,e2,e3} be the standard basis for R° and B= (b 1,b2,b3} be basis for vector spaces V, and Let T:R3 → V be a linear transformation with the property that T(x1,X2,X3) = (x2 - X3)b1+(x1+ x3)b,...

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