Decrypt the received encoded message [2,...

Decrypt the received encoded message [2,-3][20,4] with the encryption matrix `[{:(-1,-1),(2,1):}]` and the decryption matrix as its inverse, where the system of codes are described by the numbers 1-26 to the letters A-Z respectively, and the number 0 to a blank space.

Promotional Banner

Promotional Banner

Topper's Solved these Questions

APPLICATIONS OF MATRICES AND DETERMINANTS
FULL MARKS|Exercise EXERCISE -1.2|3 Videos
APPLICATIONS OF MATRICES AND DETERMINANTS
FULL MARKS|Exercise EXERCISE -1.3|5 Videos
APPLICATIONS OF MATRICES AND DETERMINANTS
FULL MARKS|Exercise EXAMPLE QUESTIONS SOLVED|10 Videos
APPLICATIONS OF INTEGRATION
FULL MARKS|Exercise ADDITIONAL PROBLEMS|35 Videos
APPLICATIONS OF VECTOR ALGEBRA
FULL MARKS|Exercise Additional Questions Solved|59 Videos

Similar Questions

Explore conceptually related problems

If the matrix [{:(-1,1,1),(3,k,4),(2,-3,5):}] has an inverse then the value of k.

Find the inverse of the matrix [{:(2,-1,3),(-5,3,1),(-3,2,3):}]

Find the matrix A if [(1,2),(0,1)]A=[(6,1),(2,1)]

Find the rank of the matrix [{:(1,2,3),(2,1,4),(3,0,5):}] by reducing it to a row-echelon form.

Find the rank of the matrix [{:(1,2,-1,3),(2,4,1,-2),(3,6,3,-7):}]

Reduce the matrix [{:(3,-1,2),(-6,2,4),(-3,1,2):}] to a row-echelon form.

Show that the matrix A=[(1, -1, 5),(-1,2,1),(5,1,3)] is a symmetric matrix.

Using elementary transformation find the inverse of the matrix [{:(3,-1),(-4,2):}]

The matrix is [(4,3,1),(0,2,3),(0,0,-2)] is:

Find the adjoint of the matrix A=[(1,1,1),(2,1,-3),(-1,2,3)] .

FULL MARKS-APPLICATIONS OF MATRICES AND DETERMINANTS-EXERCISE -1.1

Find the adjoint of the following : [[2,3,1],[3,4,1],[3,7,2]]
Text Solution
|
Find the inverse (if it exists) of the following: (i) [{:(-2,4),(1,-...
Text Solution
|
If F(alpha)=[[cos alpha,0,sin alpha],[0,1,0],[-sin alpha,0,cos alpha]]...
Text Solution
|
If A=[[5,3],[-1,-2]], show that A^(2)-3A-7I(2)=O(2) Hence find A^(-1).
Text Solution
|
If A=(1)/(9)[{:(-8,1,4),(4,4,7),(1,-8,4):}] prove that A^(-1)=A^(T).
Text Solution
|
If A=[{:(8,-4),(-5,3):}], verify that A(adjA)=(adjA)A=|A|I(2).
Text Solution
|
If A=[{:(3,2),(7,5)],andB=[(-1,-3),(5,2):}] verify that (AB)^(-1)=B^(-...
Text Solution
|
If adj (A) = [{:(2,-4,2),(-3," "12,-7),(-2," "0,2):}], find A.
Text Solution
|
If adj (A) = [{:(0,-2,0),(6,2,-6),(-3,0,6):}] "find" " "A^(-1).
Text Solution
|
Find adj (adj(A)) if adj A = [{:(1,0,1),(0,2,0),(-1,0,1):}].
Text Solution
|
A=[[1, tan x],[-tan x,1]], show that A^(T)A^(-1)=[[cos 2x,-sin 2x],[si...
Text Solution
|
Find the matrix A for which A[{:(5,3),(-1,-2):}]= [(14,7),(7,7)].
Text Solution
|
Given A=[{:(1,-1),(2,0)],B=[(3,-2),(1,1)]andC[(1,1),(2,2):}], find a m...
Text Solution
|
If A=[{:(0,1,1),(1,0,1),(1,1,0):}] show that A^(-1)=(1)/(2)(A^(2)=3I)
Text Solution
|
Decrypt the received encoded message [2,-3][20,4] with the encryption ...
Text Solution
|