Answer:
The equation for the function is f(x) = 2 * sin((π/2) * (x + π/2)) - 4.
Explanation:
To write an equation for a function with the given characteristics, we can start with the general form of a sine function:
f(x) = A * sin(B * (x - C)) + D
Where:
A is the amplitude
B determines the period (B = 2π / period)
C determines the phase shift
D determines the vertical translation
Given the characteristics you provided:
Amplitude (A) = 2
Period = 4, so B = 2π / 4 = π/2
Phase shift (C) = -π/2 (left phase shift of π/2)
Vertical translation (D) = -4 units
Plugging in these values, the equation for the function is:
f(x) = 2 * sin((π/2) * (x + π/2)) - 4
Thus,
The equation for the function is f(x) = 2 * sin((π/2) * (x + π/2)) - 4.