T = 20
min = 1
max = 0
In the first image, the period is calculated by measuring the distance on the x-axis that it takes for the function to complete a cycle.
The attached image shows a way to measure the period, marking the distance from x = 0 until the wave completes the rise and fall cycle at x = 20.
Therefore the period is 20.
In the second image it can be seen that the lowest peak of the function is y = 1. The function is never less than y = 1. Therefore, that value is the minimum.
In the third image it can be seen that the maximum value of the function is y = 0. Since it is the maximum value that reaches the top peak
1. The period of the sinusoidal function is...20
2. The minimum of the sinusoidal function is...1
3. The max of the sinusoidal function is...0
Hello from MrBillDoesMath!
y = -2
From the graph the maximum value or "highest point" on the function appears to be
y = -2
just from what i can see, i'd say 10. but idk if they want the x or y value?
Maximum Value: 0
We have been given a graph. We are asked to find the maximum value of the given sinusoidal function.
To find the maximum vale of function, we need to find the maximum value of y-coordinate for our given function.
We can see that the maximum value of sinusoidal function is 0 as the upper value of y-coordinate for the function is 0.
Given is a graph with more than 2 periods shown. The wave represents that it is the sine function.
From the graph we find that the graph gets its maximum at y=-2 and minimum at y =-6
Hence range =[-6,-2]
Amplitude = 2
There is no x intercept but y intercept =-4
Hence the possible equation would be
y = 2sin(bx+k)-4
for some real b and k
Since sine max value is 1, we have
Maximum value is 2-4 =-2
The maximum of y = sin x is 1. The amplitude of a sinusoidal function is one-half of the positive difference between the maximum and minimum values of a function.
when you graph a function on the coordinate place, the x-coordinates represents the input while the y-coordinates represent the output of the function, or the function value.
the highest possible value of a sinusoidal function is the maximum
the maximum is 5 because that is the highest value of the sinusoidal function. it is the highest y-value the function can attain.