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Section 4.7
Can you do 39 as a guide for me to do the rest?
Can you do 39 as a guide for me to do the rest?
Using Inverse Trigonometric Function
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39
tan(theta)=x/4
then theta=tan^-1(x/4 )
tan(theta)=x/4
then theta=tan^-1(x/4 )
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tan(theta) = opp/adj
tan(theta) = x/4
arctan(tan (theta)) = arctan(x/4)
theta = arctan(x/4)
Is this what you did? If so, please don't skip any parts.
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arctan(tan (theta)) = arctan(x/4) ..........this is unnecessary step,
when you have tan(theta) = x/4, you know that theta = arctan(x/4)
when you have tan(theta) = x/4, you know that theta = arctan(x/4)
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Ok. Thanks. I will do a few more later or tomorrow morning.
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Questions 40, 42 and 44.
(40) cos (theta) = 4/x
Then theta = arccos(4/x)
(42) tan (theta) = (x + 1)/10
Then theta = arctan[(x + 1)/10]
(44) sin (theta) = (x - 1)/(x^2 - 1)
Then theta = arcsin[(x - 1)/(x - 1)(x + 1)]
theta = arcsin[1/(x + 1)]
Note: For (44), I simplified the algebraic fraction in the argument for arcsin. Is this the right thing to do?
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correct
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I could not have done it without you. I thank you.
