Teaching Haryana (HPSC) Assistant Professor Mock Test 2025 Mathematical Science Analysis Matrix Representation of Linear Transformations

Let 𝑇 ∢ ℝ4 β†’ ℝ4 be a linear transformation and the null space of 𝑇 be the subspace of ℝ4 given by

{(π‘₯1, π‘₯2, π‘₯3, π‘₯4) ∈ ℝ4 ∢ 4π‘₯1 + 3π‘₯2 + 2π‘₯3 + π‘₯4 = 0}.

If π‘…π‘Žπ‘›π‘˜(𝑇 − 3𝐼) = 3, where 𝐼 is the identity map on ℝ4 , then the minimal polynomial of 𝑇 isΒ 

1
π‘₯(π‘₯ − 3)Β 
2
π‘₯(π‘₯ − 3)3
3
π‘₯3 (π‘₯ − 3)Β 
4
π‘₯2 (π‘₯ − 3)2
5
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