A(t) = 3 sin(t) 4 cos(t)] a. Find the values of t such that A(t) is not invertible. You may use k to denote any possible integer in your answer (e.g., if the answer is all integer multiples of 5, you would enter 5k, where k is any integer). A(t) is not invertible when t = k*pi/2 , where k is any integer. b. Find a formula for A-1(t) for the values of t for which A(t) is invertible. A-(t) =

A(t) = 3 sin(t) 4 cos(t)] a. Find the values of t such that A(t) is not invertible. You may use k to denote any possible integer in your answer (e.g., if the answer is all integer multiples of 5, you would enter 5k, where k is any integer). A(t) is not invertible when t = k*pi/2 , where k is any integer. b. Find a formula for A-1(t) for the values of t for which A(t) is invertible. A-(t) =

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter5: Inverse, Exponential, And Logarithmic Functions

Section5.6: Exponential And Logarithmic Equations

Problem 64E

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b. Find a formula for A⁻¹(t) for the values of t for which A(t) is invertible.

(see image)

3 sin(t) -4 cos(t)
[3 sin(t)
A(t) =
4 cos(t)
a. Find the values of t such that A(t) is not invertible. You may use k to denote any possible integer in your answer (e.g., if the answer is all integer multiples
of 5, you would enter 5k, where k is any integer).
A(t) is not invertible when t = k*pi/2
where k is any integer.
b. Find a formula for A-1(t) for the values of t for which A(t) is invertible.
A-1(t)

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