`A=[[1, 0],[ 1, 1]]`and `I=[[1, 0],[ 0, 1]]`, then which one of the following holds for all `n>=1` (by principle of mathematical induction)

If A=[[1,01,1]] and I=[[1,00,1]], then which one of the following holds for all n>=1 (by the principle of mathematical induction)

If A = [(1,0),(1,1)] and I = [(1,0),(0,1)] , then which one of the following holds for all n ge 1 by the principle of mathematical induction :

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 by the principle of mathematical induction?

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 , by the principle of mathematical induction.

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 by the principle of mathematica induction? (A) A^n=2^(n-1) A+(n-1)I (B) A^n=nA+(n-1) I (C) A^n=2^(n-1) A-(n-1)I (D) A^n=nA-(n-1) AI

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 by the principle of mathematica induction? (A) A^n=2^(n-1) A+(n-1)I (B) A^n=nA+(n-1) I (C) A^n=2^(n-1) A-(n-1)I (D) A^n=nA-(n-1) AI

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 by the principle of mathematica induction? (A) A^n=2^(n-1) A+(n-1)I (B) A^n=nA+(n-1) I (C) A^n=2^(n-1) A-(n-1)I (D) A^n=nA-(n-1) AI

If A=[(1,0),(1,1)] and I=[(1,0),(0,1)] then which one of the following holds for all nge1 by the principle of mathematica induction? (A) A^n=2^(n-1) A+(n-1)I (B) A^n=nA+(n-1) I (C) A^n=2^(n-1) A-(n-1)I (D) A^n=nA-(n-1) AI

Prove the following by the principle of mathematical induction: 1+3+3^2++3^(n-1)=(3^n-1)/2