2) Let Let T : R3 - R3 such that T(ij) ,, j 1,2,3. Find the matrix A associated to T in the canonical basis. Find a basis of its kernel and its image. Verify your answers. 2) Let Let T : R3 - R3 such that T(ij) ,, j 1,2,3. Find the matrix A associated to T in the canonical basis. Find a basis of its kernel and its image. Verify your answers.
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Suppose A is the matrix for T: R3 → R3 relative to the standard basis. Find the matrix A' for T relative to the basis B': 3 -2 A 4 2 5 B' = {(1,1, -1), (1,-1,1),(-1,1,1)}
Let T: R3 ? R3 be a linear transformation such that T(1, o, o)-(4,-1,2). TO, 1, o)-(,-2. 3), and To, o. 1)-a,-20·Find the indicated image.
1) find the power of w(t) 2) find the complex fourier series of coefficient of w(t) 2. (10 points) Consider the waveform shown below: w(t) 2 w t -4 -2 0 2
0 17 (2 points) Find the projection of5onto the subspace W of R3 spanned by6 U- -1 projw (V) 0 17 (2 points) Find the projection of5onto the subspace W of R3 spanned by6 U- -1 projw (V)
4. (12 pts) Show the matrix operator T: R3 R3 given by the following equations is one-to-one; Find the standard matrix for the inverse operator T-1, and find T-(W1, W2, W3). w1 = x1 +22-23 W2 = 2x1 +2:22 - 23 W3 = 21 - 2202
Find the matrix A' for T relative to the basis B'. T: R3 → R3, T(x, y, z) = (x, y, z), B' = {(1, 0, 1), (0, 1, 1), (1, 1, 0)} A' = 11 JITE
Fourier transforms using Properties and Table 1·2(t) = tri(t), find X(w) w rect(w/uo), find x(t) 2. X(w) 3, x(w) = cos(w) rect(w/π), find 2(t) X(w)=2n rect(w), find 2(t) 4. 5, x(w)=u(w), find x(t) Reference Tables Constraints rect(t) δ(t) sinc(u/(2m)) elunt cos(wot) sin(wot) u(t) e-ofu(t) e-afu(t) e-at sin(wot)u(t) e-at cos(wot)u(t) Re(a) >0 Re(a) >0 and n EN n+1 n!/(a + ju) sinc(t/(2m) IIITo (t) -t2/2 2π rect(w) with 40 2r/T) 2Te x(u) = F {r) (u) aXi(u) +X2() with a E...
Find the matrix A' for T relative to the basis B'. T: R3 R3, T(x, y, z) = (x, y, z), B' = {(1, 0, 1), (0, 1, 1), (1, 1, 0)} 0 A 11 1 0 11 X