The function f(x) is represented by the table below. what are the corresponding values of g(x) for the transformation g(x)=4f(x)
(-8,3),(-5,2),(0,5),(3,1),(9,6)
To find the corresponding values of g(x) for the transformation g(x) = 4f(x), we simply multiply the y-values of the given points by 4.
(-8, 3) -> g(-8) = 4f(-8) = 4(3) = 12
(-5, 2) -> g(-5) = 4f(-5) = 4(2) = 8
(0, 5) -> g(0) = 4f(0) = 4(5) = 20
(3, 1) -> g(3) = 4f(3) = 4(1) = 4
(9, 6) -> g(9) = 4f(9) = 4(6) = 24
So, the corresponding values of g(x) for the transformation g(x) = 4f(x) are:
(-8, 12), (-5, 8), (0, 20), (3, 4), (9, 24).
To find the corresponding values of g(x) for the transformation g(x) = 4f(x), we need to multiply the y-values of f(x) by 4.
Using the given table of values for f(x):
(-8, 3), (-5, 2), (0, 5), (3, 1), (9, 6)
We can multiply the y-values by 4 to find the corresponding values of g(x):
For (-8, 3):
g(x) = 4 * f(x) = 4 * 3 = 12
So, for (-8, 3), the corresponding value of g(x) is ( -8, 12).
For (-5, 2):
g(x) = 4 * f(x) = 4 * 2 = 8
So, for (-5, 2), the corresponding value of g(x) is ( -5, 8).
For (0, 5):
g(x) = 4 * f(x) = 4 * 5 = 20
So, for (0, 5), the corresponding value of g(x) is ( 0, 20).
For (3, 1):
g(x) = 4 * f(x) = 4 * 1 = 4
So, for (3, 1), the corresponding value of g(x) is ( 3, 4).
For (9, 6):
g(x) = 4 * f(x) = 4 * 6 = 24
So, for (9, 6), the corresponding value of g(x) is ( 9, 24).
Therefore, the corresponding values of g(x) for the transformation g(x) = 4f(x) are:
(-8, 12), (-5, 8), (0, 20), (3, 4), (9, 24).
To find the corresponding values of g(x) for the transformation g(x) = 4f(x), we need to multiply the y-values of f(x) by 4.
Here are the steps to obtain the corresponding values of g(x):
Step 1: Take the given y-values from the f(x) table:
(-8, 3), (-5, 2), (0, 5), (3, 1), (9, 6)
Step 2: Multiply each y-value by 4 to get the corresponding values of g(x):
For (-8, 3), g(-8) = 4 * 3 = 12. Therefore, the corresponding value of g(x) for (-8, 3) is ( -8, 12).
For (-5, 2), g(-5) = 4 * 2 = 8. Therefore, the corresponding value of g(x) for (-5, 2) is (-5, 8).
For (0, 5), g(0) = 4 * 5 = 20. Therefore, the corresponding value of g(x) for (0, 5) is (0, 20).
For (3, 1), g(3) = 4 * 1 = 4. Therefore, the corresponding value of g(x) for (3, 1) is (3, 4).
For (9, 6), g(9) = 4 * 6 = 24. Therefore, the corresponding value of g(x) for (9, 6) is (9, 24).
So, the corresponding values of g(x) for the transformation g(x) = 4f(x) are:
(-8, 12), (-5, 8), (0, 20), (3, 4), (9, 24).