Answer:
The correct option is 1. The function f(x) has the largest maximum.
Step-by-step explanation:
The vertex form of a parabola is
[tex]y=a(x-h)^2+k[/tex]
Where, (h,k) is vertex.
The given functions is
[tex]h(x)=-(x-5)^2+3[/tex]
Here, a=-1, h=-5 and k=3. Since the value of a is negative, therefore it is an downward parabola and vertex is the point of maxima.
Thus the maximum value of the function h(x) is 3.
[tex]g(x)=4\cos (2x-\pi)-2[/tex]
The value of cosine function lies between -1 to 1.
[tex]-1\leq \cos (2x-\pi)\leq 1[/tex]
Multiply 4 on each side.
[tex]-4\leq 4\cos (2x-\pi)\leq 4[/tex]
Subtract 2 from each side.
[tex]-4-2\leq 4\cos (2x-\pi)-2\leq 4-2[/tex]
[tex]-6\leq 4\cos (2x-\pi)-2\leq 2[/tex]
Therefore the maximum value of the function g(x) is 2.
From the given table it is clear that the maximum value of the function f(x) is 4 at x=3.
Since the function f(x) has the largest maximum, therefore the correct option is 1.
