For the matrix A=[3 1 7 5] , find x and ...

For the matrix `A=[3 1 7 5]` , find `x` and `y` so that `A^2+x I=y Adot`

Text Solution

Verified by Experts

The correct Answer is:

`x=y=8, A^(-1)=[(5//8,-1//8),(-7//8,3//8)]`

We have
`A=[(3,1),(7,5)]`
`A^(2)=A A=[(3,1),(7,5)][(3,1),(7,5)]`
`=[(9+7,3+5),(21+35,7+25)]=[(16,8),(56,32)]`
Now, `A^(2)+xI=yA`
`implies [(16,8),(56,32)]+x[(1,0),(0,1)]=y[(3,1),(7,5)]`
`[(16+x,8+0),(56+0,32+x)]=[(3y,y),(7y,5y)]`
`16+x=3y, y=8, 7y=56, 5y=32+x`
Putting `y=8` in `16+x=3y`, we get `x=24-16=8`. Clearly, `x=8` and `y=8` also satify `7y=56` and `5y=32+x`. Hence,`x=8` and `y=8`. We have
`|A|=|(3,1),(7,5)|=8 ne 0`
So, A is invertible.
Putting `x=8, y=8` in `A^(2)+ xI=yA`, we get
`A^(2)+8I=8A`
`implies A^(-1) (A^(2)+8I)=8A^(-1) A`
`A^(-1) A^(2)+8A^(-1)I=8A^(-1) A`
`A+8A^(-1)=8I`
`[ :' A^(-1) A^(2)=(A^(-1) A)A=IA=A, A^(-1)I=A^(-1) and A^(-1) A=I]`
`8A^(-1)=8I-A`
or `A^(-1)=1/8 (8I-A)=1/8 {[(8,0),(0,8)]-[(3,1),(7,5)]}`
`=1/8 [(8-3,0-1),(0-7,8-5)]=1/8 [(5,-1),(-7,3)]=[(5//8,-1//8),(-7//8,3//8)]`

Topper's Solved these Questions

MATRICES
CENGAGE|Exercise Exercise (Single)|65 Videos
MATRICES
CENGAGE|Exercise Exercise (Multiple)|33 Videos
MATRICES
CENGAGE|Exercise Exercise 13.4|12 Videos
MATHMETICAL REASONING
CENGAGE|Exercise JEE Previous Year|10 Videos
METHODS OF DIFFERENTIATION
CENGAGE|Exercise Multiple Correct Answer Type|7 Videos

Similar Questions

Explore conceptually related problems

Find the a relation between x and y such that the point (x, y) is equidistant from the points (7,1) and (3, 5) .

Evaluate each of the following in terms of x and y, if it is given that x = log_(2)3 and y = log_(2)5 log_(2)7.5

Find the matrix X if 2X+[(1, 3), (5, 7)]=[(5, 7), (9, 5)]

Find the values of x, y, z if the matrix A=[(0, 2y,z),(x,y,-z),(x,-y,z)] satisfy the equation A'A=I .

Solve by matrix method : 2x+3y = 5, 3x-y = 2.

Consider point P(x, y) in first quadrant. Its reflection about x-axis is Q(x_(1), y_(1)) . So, x_(1)=x and y(1)=-y . This may be written as : {(x_(1)=1. x+0.y),(y_(1)=0. x+(-1)y):} This system of equations can be put in the matrix as : [(x_(1)),(y_(1))]=[(1,0),(0,-1)][(x),(y)] Here, matrix [(1,0),(0,-1)] is the matrix of reflection about x-axis. Then find the matrix of (i) reflection about y-axis (ii) reflection about the line y=x (iii) reflection about origin (iv) reflection about line y=(tan theta)x

Find the values of x and y so that the vectors 4 hat i + 5 hat j and x hat i + y hat j are equal.

CENGAGE-MATRICES-Exercise 13.5

By the method of matrix inversion, solve the system. [(1,1,1),(2,5,7...
Text Solution
|
Let A=[[2,0,7] , [0,1,0], [1,-2,1]] and B=[[-x,14x,7x] , [0,1,0] , [x,...
Text Solution
|
If A=[{:(0,1,1),(1,0,1),(1,1,0):}] show that A^(-1)=(1)/(2)(A^(2)=3I)
Text Solution
|
For the matrix A=[3 1 7 5] , find x and y so that A^2+x I=y Adot
Text Solution
|
If A^(3)=O, then prove that (I-A)^(-1) =I+A+A^(2).
Text Solution
|
If A=[[cos alpha, -sin alpha] , [sin alpha, cos alpha]], B=[[cos2beta,...
Text Solution
|
If A=[(1,2,2),(2,2,3),(1,-1,3)], C=[(2,1,1),(2,2,1),(1,1,1)], D=[(10),...
Text Solution
|
If A is a 2xx2 matrix such that A^(2)-4A+3I=O, then prove that (A+3I)^...
Text Solution
|
For two unimobular complex numbers z(1) and z(2), find [(bar(z)(1),-z(...
Text Solution
|
Prove that inverse of a skew-symmetric matrix (if it exists) is skew-s...
Text Solution
|
If square matrix a is orthogonal, then prove that its inverse is also ...
Text Solution
|
If A is a skew symmetric matrix, then B=(I-A)(I+A)^(-1) is (where I is...
Text Solution
|
Prove that ("adj. "A)^(-1)=("adj. "A^(-1)).
Text Solution
|
Using elementary transformation, find the inverse of the matrix A=[(a,...
Text Solution
|
Show that the two matrices A, P^(-1) AP have the same characteristic r...
Text Solution
|
Show that the characteristics roots of an idempotent matris are either...
Text Solution
|
If alpha is a characteristic root of a nonsin-gular matrix, then prove...
Text Solution
|