If we mark off a distance t along the unit circle, starting at (1, 0) and moving in a counterclockwise direction, we arrive at the terminal point determined by t. (b) What are the terminal points determined by π/2, π, −π/2, and 2π? π/2 (x, y) = π (x, y) = −π/2 (x, y) = 2π (x, y) =
If we mark off a distance t along the unit circle, starting at (1, 0) and moving in a counterclockwise direction, we arrive at the terminal point determined by t. (b) What are the terminal points determined by π/2, π, −π/2, and 2π? π/2 (x, y) = π (x, y) = −π/2 (x, y) = 2π (x, y) =
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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If we mark off a distance t along the unit circle, starting at (1, 0) and moving in a counterclockwise direction, we arrive at the terminal point determined by t.
(b) What are the terminal points determined by π/2, π, −π/2, and 2π?
| π/2 | (x, y) =
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| π | (x, y) =
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| −π/2 | (x, y) =
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| 2π | (x, y) =
|
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