Linear algebra proof with operator T^2 = cT

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evilpostingmong
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Homework Statement


Let T:V--->V be an operator satisfying T^2=cT c=/=0.
Show that V=U[tex]\oplus[/tex]kerT U={u l T(u)=cu}

Homework Equations


The Attempt at a Solution


Now before I start, just one quick question about ker T:
U seems to be an eigenspace since T(u)=cu with c the eigenvalue.
But that must mean that the kernel has 0 as the only element since
0 is not an eigenvector so it can't be in the eigenspace, right?
And, since T^2=cT, c cannot be 0 otherwise we would have T(0).
 
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Hi evilpostingmong! :smile:

(have a not-equal: ≠ and try using the X2 tag just above the Reply box :wink:)
evilpostingmong said:
Let T:V--->V be an operator satisfying T^2=cT c=/=0.
Show that V=U[tex]\oplus[/tex]kerT U={u l T(u)=cu}

Now before I start, just one quick question about ker T:
U seems to be an eigenspace since T(u)=cu with c the eigenvalue.
But that must mean that the kernel has 0 as the only element since
0 is not an eigenvector so it can't be in the eigenspace, right?
And, since T^2=cT, c cannot be 0 otherwise we would have T(0).

T2 = cT means T is a projection …

so suppose eg V is R3, and T is the projection onto the x-y plane (with c = 1),

then kerT is the z-axis. :wink: