1. Define T: R → R° such that T(a) = (1,2,1), T(b) = (0,1,3), T(C) = (1,0, -1). %3D %3D Calculate T(-2,3, –1).

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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Home
Insert
Desigh
Laybut
Let å =
(first two ID digits), 5
(middle three ID digits), č = 1 (last two digits)
Let i =
(first three digits), v =
(last four digits)
2
1
5 7 4 9
Let A =
(place your whole ID in each row)
1
5 7 4
9 1
Calculations.
1. Define T: R → R³ such that T(à) = (1,2,1), T(B) = (0,1,3), T() = (1,0,–1).
Calculate T(-2,3, –1).
2. Define T:R? → R² by T(x,y) = (3x – 2y,y –- 2x).
a) Construct the standard matrix for T.
b) Construct the matrix for T relative to the basis {(5,2), (2,1)}.
c) Construct the matrix for T1 relative to the basis {(1,1), (1,2)}.
92 words
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Transcribed Image Text:Home Insert Desigh Laybut Let å = (first two ID digits), 5 (middle three ID digits), č = 1 (last two digits) Let i = (first three digits), v = (last four digits) 2 1 5 7 4 9 Let A = (place your whole ID in each row) 1 5 7 4 9 1 Calculations. 1. Define T: R → R³ such that T(à) = (1,2,1), T(B) = (0,1,3), T() = (1,0,–1). Calculate T(-2,3, –1). 2. Define T:R? → R² by T(x,y) = (3x – 2y,y –- 2x). a) Construct the standard matrix for T. b) Construct the matrix for T relative to the basis {(5,2), (2,1)}. c) Construct the matrix for T1 relative to the basis {(1,1), (1,2)}. 92 words O. Focus 目 O Type here to search 立
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