Let T: P₁ → R² be defined by T (P) Let q(t) = 5t6t² +7t³. Find T(q). Find a basis for the kernel of T. where p'(t) is the derivative of the arbitrary polynomial p(t) = a + a₁t+ a₂t² + ast³ + astª, where ao, a1, 92, 93, 94 € R. Find a basis for the range of T. - p(0) p'(0)

Let T: P₁ → R² be defined by T (P) Let q(t) = 5t6t² +7t³. Find T(q). Find a basis for the kernel of T. where p'(t) is the derivative of the arbitrary polynomial p(t) = a + a₁t+ a₂t² + ast³ + astª, where ao, a1, 92, 93, 94 € R. Find a basis for the range of T. - p(0) p'(0)

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter3: Functions And Graphs

Section3.3: Lines

Problem 21E

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Question

Let T: P₁ → R² be defined by
T (P)
Let q(t) = 5t6t² +7t³. Find T(q).
Find a basis for the kernel of T.
where p'(t) is the derivative of the arbitrary polynomial p(t) = a + a₁t+ a₂t² + ast³ + astª,
where ao, a1, 92, 93, 94 € R.
Find a basis for the range of T.
-
p(0)
p'(0)

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