MATHEMATICS

JAMB 2001 - Question 18

Mathematics 2001 JAMB Past Questions - Question 18: Given the matrix K=(2 1 ,3 4) ,the matrix K² +K+1 ,where I is the 2x2 identify matrix is

Given the matrix K=(2 1 ,3 4) ,the matrix K² +K+1 ,where I is the 2x2 identify matrix is
A:
B:
C:
D:
Examkits App

Examkit's JAMB CBT App

Practice JAMB offline with our Online, PC and Mobile App

  • ✅ 25+ years of past questions (2000 to 2025)
  • ✅ Video solutions and explanation to questions
  • ✅ E-library
  • ✅ Study by topic
  • ✅ And more.

Correct Answer

B

Explanation

To find the matrix K² + K + 1, we first need to calculate the square of matrix K.Matrix K:K = [2 1]    [3 4]Square of matrix K (K²):K² = K * KK * K = [2 1] * [2 1]          [3 4] [3 4]Calculating the matrix multiplication:K * K = [(2*2 + 1*3) (2*1 + 1*4)]          [(3*2 + 4*3) (3*1 + 4*4)]K * K = [7 6]          [18 19]Now, let's add K² to K and then add the identity matrix:K² + K = [7 6] + [2 1]            [18 19] [3 4]Adding the matrices:K² + K = [7+2 6+1]            [18+3 19+4]K² + K = [9 7]            [21 23]Finally, let's add 1 to the resulting matrix:K² + K + 1 = [9+1 7+1]                  [21+1 23+1]K² + K + 1 = [10 8]                  [22 24]Therefore, the matrix K² + K + 1, where K is the given matrix, and I is the 2x2 identity matrix, is:[10 8][22 24]

Frequently Asked Questions

Examkits is a JAMB CBT practice platform that provides over 20 years of past questions, Post UTME questions, and detailed video solutions to help students prepare for their exams.

You can practice JAMB past questions online, on Android, or on a desktop using the Examkits app. Just register on our website and choose your preferred device.

Yes. Our Android and Windows versions support offline usage. Once downloaded and activated, no internet is required to use most of the features.

Yes, Examkits provides detailed video explanations for all JAMB past questions from 2000 to 2024, helping students understand how to solve each problem.

Examkits offers free practice for some subjects. However, full access requires a one-time affordable activation fee for each version of the app.