We have #A=((2,-1),(4,-2))#.Number of solutions from #M_2(RR)#of equation #X^25=A#?

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Answer 1 · 2017-07-10T13:47:34

See below.

Supposing that #X_0# is a solution for

#X_0^25=A#

According with Cayley-Hamilton theorem

we have

#X_0^2+alpha X_0+beta I_2=0_2# or

#X_0^2= -alpha X_0-beta I_0#

#X_0^3=-alpha X_0^2-beta X_0 = -alpha( -alpha X_0-beta I_0)-beta X_0 = (alpha^2-beta)X_0+alpha beta I_0#

# cdots #

#X_0^25 = c_1 X_0+c_2 I_2#

then

#X_0^25 = A = c_1 X_0+c_2 I_2# then

#X_0 = 1/c_1 A - c_2/c_1 I_2 = lambda A+mu I_2#

but #A^2=0_2#

then

#X_0*A=lambda A^2+mu A = mu A#

but then

#X_0 = mu I_2# which is not a solution. Concluding the equation

#X^25=A# has not real solutions.