If M is a `3xx3` matrix, where `det M = I and M M^(T) = I,`
where `I` is an identity matrix, prove that `det(M-I) = 0`

If M is a 3xx3 matrix,where det M=1 and MM^(T)=1, where I is an identity matrix,prove theat det (M-I)=0

If M is a 3 xx 3 matrix, where det M=1 and MM^T=1, where I is an identity matrix, prove theat det (M-I)=0.

If M is a 3 xx 3 matrix, where det M=1 and MM^T=1, where I is an identity matrix, prove theat det (M-I)=0.

If M is a 3xx3 matrix, where det M=1a n dM M^T=I,w h e r eI is an identity matrix, prove that det (M-I)=0.

If M is a 3xx3 matrix, where det M=1a n dM M^T=1,w h e r eI is an identity matrix, prove theat det (M-I)=0.

If M is a 3xx3 matrix, where det M=1a n dM M^T=1,w h e r eI is an identity matrix, prove theat det (M-I)=0.

If A=I is 2x2 matrix then det(I+A)=

If M is a 3xx3 matrix such that M^(2)=O , then det. ((I+M)^(50)-50M) where I is an identity matrix of order 3, is equal to:

If M is a 3xx3 matrix such that M^(2)=O , then det. ((I+M)^(50)-50M) where I is an identity matrix of order 3, is equal to:

If M is a 3times3 matrix such that M^(2)=0 ,then det ((I+M)^(50)-50M) where I is an identity matrix of order 3, is equal to.