In November 2024
Answer to Question #232552 in Linear Algebra for Amuj
Let T:U→V be a linear transformation. Let 0_u and 0_v be zero vectors of U and V. Show that T(0_U )=0_V
Let U, V be a vector space
"O: V \\implies" to be a mapping such that o(v)= ou where ou is zero element in U
Now let "V_1, V_2 \\epsilon V"
Then O(V1+V2) =0u
"\\implies T(0_U )=0_V"
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