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Determmine value of k such that



Kx+y+z=1



X+ky+z=1



X+y+kz=1 has a) no solution b) unique solution c) more than one solution





  1. Use A-1 to decode the cryptograph. A = [ 1,2;3,5]

39 69 29 53 55 92 3 33 59 11 41 13

  1. Encode the message "TUESDAY" using the matrix A =[1,2;3,5]
  2. Find the least regression line of (0, –3), (1, – 1), (2, 1), and (3, 3)

Define T : R2  R2



: T(x1



, x2



) = (– x2



, x1



).



Show that T is a linear transformation.



What is the matrix of T with respect to the



standard basis ? What is the matrix of



T with respect to the basis {v1



, v2



} of R2



,



where v1 = (1, 2), v2 = (1, – 1) ? 4



(b) Find W, where  is with respect to the



standard inner product of R4



, and



W = {(x1



, x2



, x3



, x4



)  R4|2x1 + 3x2 + 5x3 +



x4 = 0, x1 + x2 + x3 = 0}. 3



(c) Suppose U and W are subspaces of a



vector space V, where dimRV = 8. Suppose



dimRU = 4, and dimRW = 5. What are the



possible values of dimR(U  W)

2a. Solve the quadratic equation

3z2 + (a - i)z + 3i = 0.


b. Solve the following system of equations of complex numbers:


z + iw = 1 + 2i

z - w = 1 -2i




For which value of k will the vector v1=(1, −2, k) in R



3



be a linear combination of



v2 = (3, 0, −2) and v2= (2, −1, 5)?

Show that T(x1, x2, x3, x4) = 3x1_7x2+5x4 is a linear transformation by finding the matrix for the transformation. Then find the basis for the null space of the transformation.


Let V be a vector space of 2×2 matrices over R. Show that the set S defined by S={(a,b)(c,d)belongs to V :a+b=0} is a subspace of R

Let ( u1,u2,...un) be an orthogonal basis for a subspace W of R^n and let T:R^n-->R^n be defined by T(x)=proj W(x). Show that T is linear transformation.


Show that T(x1,x2, x3,x4)= 3x1 -7x2+5x4 is liner transformation by finding the matrix for transformation. Then find a basis for the null space of the transformation


Let T:R^n--> R^m be a linear transformation and let ( v1,v2,....v3) be a linearly dependent set. Show that the set ( T (v1),T(v2),....T(vn))is also necessarily linearly dependent.


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