[" 1."=[[1,1],[0,1]]" will "n in N" an "...

[" 1."=[[1,1],[0,1]]" will "n in N" an "" for "(" for all "n in N" ) "],[[" If "(10)A=[[3,-4],[1,-1]]," Rand "P" (show that) "A^(n)=[[1+2n,-4n],[n,1-2n]]]]

Similar Questions

Explore conceptually related problems

If A=[(3,-4),(1,-1)] , prove by induction that A_n=[(1+2n,-4n),(n,1-2n)],n in N

Answer the following questions.If A=[[3,-4],[1,-1]] ,prove that A^n=[[1+2n,-4n],[n,1-2n]] for all n in N

If A=[[3,-4],[1,-1]] , then prove that A^n=[[1+2n,-4n],[n,1-2n]] , where n is any positive integer.

If A=[[3,-4] , [1,-1]] then by the method of mathematical induction prove that A^n=[[1+2n,-4n] , [n,1-2n]]

If A= [[3,-4] , [1,-1]] then by the method of mathematical induction prove that A^n=[[1+2n,-4n] , [n,1-2n]]

Prove by method of induction: P(n) = [[3,-4],[1,-1]]^n = [[2n+1, -4n],[n, -2n+1]]

IF A=[{:(3,-4),(1,-1):}] then show that A^n=[{:(1+2n,-4n),(n,1-2n):}] , for any integer n ge1 .

if A=[[3, -4],[ 1, (-1)]] , then prove that A^n=[[1+2 n, -4 n ],[n , 1-2n]] where n is any positive integer.

If A=[(3,-4),(1,-1)] , then prove that A^(n)=[(1+2n,-4n),(n,1-2n)] , where n is any positive integer.

if A=[{:(3,-4),(1m,-1):}], then show that A^(n)=[{:(1+2n,-4n),(n,1-2n):}] is true for all natural values of n.