given the function G(t)=4t+1 find each of the following G(2)=, G(-10)=, G(6.9)= plz help me don't understand this
Subsitute the 2 for the t, and then the -10, then the 6.9 so you get:
g(2) = 4(2) + 1 = 9
g(-10) = 4(-10) + 1 = -39
g(6.9) = 4(6.9) + 1 = 28.6
:D
thanks so much
To find the value of G(t) for different values of t, you can simply substitute the value of t into the given function. Let's use the function G(t) = 4t + 1.
1. G(2):
To find G(2), substitute t = 2 into the function G(t) = 4t + 1:
G(2) = 4(2) + 1
G(2) = 8 + 1
G(2) = 9
2. G(-10):
To find G(-10), substitute t = -10 into the function G(t) = 4t + 1:
G(-10) = 4(-10) + 1
G(-10) = -40 + 1
G(-10) = -39
3. G(6.9):
To find G(6.9), substitute t = 6.9 into the function G(t) = 4t + 1:
G(6.9) = 4(6.9) + 1
G(6.9) = 27.6 + 1
G(6.9) = 28.6
So, the values of G(2), G(-10), and G(6.9) are 9, -39, and 28.6, respectively.