Let Then is equal to:
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:2
Step-by-step solution
Standard Method
Given:
and
Find:
From the extracted working,
and
the solution gives the general form
So,
Also, the extracted solution substitutes
Now,
Equating corresponding entries as shown in the solution,
Therefore,
So,
which gives
Hence the set has two elements.
Therefore, .
Using the matrix pattern
Given:
Find: the number of integers satisfying the matrix equation.
The provided solution observes a pattern in powers of :
This leads to
for the exponents used in the working.
Replacing by and ,
Hence,
From the solution,
So we compare entries:
which gives
Thus,
Therefore, the number of valid integers is .
Common mistakes
Using the matrix written in the question as by reading the superscripts incorrectly. This is wrong because the solution working clearly uses powers and with the right side . Read matrix exponents carefully before equating entries.
Equating only one scalar-looking expression and ignoring that this is a matrix equation. This is wrong because two matrices are equal only when their corresponding entries are equal. First write both sides as full matrices, then compare matching entries.
Missing the pattern for and computing many powers separately. This is inefficient and can lead to errors. Instead, observe the entry pattern from successive powers and then substitute and directly.
Practice more Algebra of Matrices questions
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.
Related questions
- For the matrices A = bmatrix 3 & -4 1 & -1 bmatrix and B = bmatrix -29 & 49 -13 & 18 bmatrix, if (A^15 + B)…Medium · JEE 2026
- Let A = bmatrix 0 & 2 & -3 -2 & 0 & 1 3 & -1 & 0 bmatrix and B be a matrix such that B(I - A) = I + A. Then…Medium · JEE 2026
- The number of 3 2 matrices A, which can be formed using the elements of the set -2,-1,0,1,2 such that the sum…Medium · JEE 2026
- Let A = bmatrix & -1 6 & bmatrix, 0, such that (A) = 0 and + = 1. If I denotes the 2 2 identity matrix, then…Medium · JEE 2025
- Let A be a 3 3 real matrix such that A^2(A - 2I) - 4(A - I) = O, where I and O are the identity and null…Medium · JEE 2025
- Let A = bmatrix & 0 & - 0 & 1 & 0 & 0 & bmatrix. If for some (0,), A^2 = A^T, then the sum of the diagonal…Medium · JEE 2025
