The amplitude of the function [ sin(x) ] is 1 peak and 2 peak-to-peak .
The amplitude of 6 times that function is 6 peak and 12 peak-to-peak.
y = sin(-x)Amplitude = 1Period = 2 pi
The [ 2x + 1 ] represents a function of 'y' .
The function y=x is a straight line. The range is all real numbers.
No.
7
The amplitude of a function is half the distance between the maximum and minimum values. This is the absolute value of the number in front of the trig function. for example, y=Asin(x) or y= Acos(x) the absolute value of A is the amplitude. Therefore, the amplitude of y=-2sinx is 2
amplitude of the function y =-3 sin 3x
The amplitude is 1.
The amplitude is ' 1 ' .
The amplitude is 4 .
The amplitude of the wave [ y = -2 sin(x) ] is 2.
'Y' varies between -4 and +4. Viewed as a wave, its amplitude is 4.
5
3
y = sin(-x)Amplitude = 1Period = 2 pi
The amplitude of the function ( y = 3 \sin(4x) ) is 3, which is the coefficient in front of the sine function. The period can be found using the formula ( \frac{2\pi}{b} ), where ( b ) is the coefficient of ( x ); in this case, ( b = 4 ). Therefore, the period is ( \frac{2\pi}{4} = \frac{\pi}{2} ).
determine whether each relation is a function y equals -8