Question
the products (A) and (B) are:
The correct answer is:
Related Questions to study
A matrix A = (aij) m x n is said to be a square matrix if-
A matrix A = (aij) m x n is said to be a square matrix if-
For any square matrix A = [aij], aij = 0, when i j, then A is-
For any square matrix A = [aij], aij = 0, when i j, then A is-
The multiplicative inverse of A =is
The multiplicative inverse of A =is
(A) and (B) are:
(A) and (B) are:
A = , then A3 – 4A2 – 6A is equal to -
A = , then A3 – 4A2 – 6A is equal to -
Inverse of the matrix is
Inverse of the matrix is
If A = and A2 – 4A – n I = 0, then n is equal to
If A = and A2 – 4A – n I = 0, then n is equal to
The value of x for which the matrix product equal an identity matrix is :
The value of x for which the matrix product equal an identity matrix is :
If A = , then A–1 is equal to :
If A = , then A–1 is equal to :
If A is a singular matrix, then adj A is :
If A is a singular matrix, then adj A is :
Statement - I The value of x for which (sin x + cos x)1 + sin 2x = 2, when 0 ≤ x ≤ , is only.
Statement - II The maximum value of sin x + cos x occurs when x =
In this question, we have to find the statements are the correct or not and statement 2 is correct explanation or not, is same as assertion and reason.
Statement - I The value of x for which (sin x + cos x)1 + sin 2x = 2, when 0 ≤ x ≤ , is only.
Statement - II The maximum value of sin x + cos x occurs when x =
In this question, we have to find the statements are the correct or not and statement 2 is correct explanation or not, is same as assertion and reason.