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The functions f(theta) and g(theta) are sine functions, where f(0) = g(0) = 0.
The amplitude of f(theta) is twice the amplitude of g(theta).
The period of f(theta) is one-half the period of g(theta).
If g(theta) has a period of 2pi and f(pi/4)=4. Write the function rule for g(theta).
Explain your reasoning.
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Notice that I changed/edited your post
by guiding my common sense and the context.
Also, in this situation, there is no need to torture yourself, writing "theta" everywhere,
when it is possible to replace it by short variable "x".
According to the problem, functions g(x) is sinusoidal, has the value of 0 at x= 0
and has a period . Hence, g(x) has the form
g(x) = , where real number "b" is the amplitude of g(x).
Function f(x) is sinusoidal, has the value of 0 at x= 0 and has a period, which is
one-half of that of g(x), i.e. . Hence, f(x) has the form
f(x) = , where real number "a" is the amplitude of f(x).
Next, we are given = 4. It means = 4, or = 4.
Since = 1, it gives us a = 4.
It implies, due to the problem description, that the amplitude of g(x) is 2 : b = 2.
Thus g(x) has the form
g(x) = . ANSWER
Solved.