Answer:
The correct answer is C
Step-by-step explanation:
The easiest way to check is to use the definition of an even function;
If a function is even, then
[tex]f(a)=f(-a)[/tex]
The sine function and its inverse are odd functions.
The tangent function is also an odd function.
Let us verify this definition for the cosine function.
Let
[tex]f(x)=3\cos^2(3x)-\cos(x)[/tex]
Then
[tex]f(a)=3\cos^2(3a)-\cos(a)[/tex]
Also,
[tex]f(-a)=3\cos^2(-3a)-\cos(-a)[/tex]
Recall that;
[tex]\cos(-\theta)=\cos(\theta)[/tex]
[tex]f(-a)=3\cos^2(3a)-\cos(a)[/tex]
Hence;
[tex]f(a)=f(-a)[/tex]
The correct answer is C.
If you try this for;
[tex]f(x)=2sin^2(4x)+5sin(x)[/tex]
We will obtain;
[tex]f(a)=2sin^2(4a)+5sin(a)[/tex]
and
[tex]f(-a)=2sin^2(-4a)+5sin(-a)[/tex]
Recall that;
[tex]\sin(-\theta)=-\sin(\theta)[/tex]
This implies that;
[tex]f(-a)=-2sin^2(4a)-5sin(a)[/tex]
Hence;
[tex]f(a) \ne f(-a)[/tex]
The same thing applies to the tangent function as well as the co-secant function.
