For f (x):
The domain of the function is given by the values of x that satisfy the following inequality:
x> 2
Equivalently:
(2, inf)
For g (x):
g (x) = sqrt (2x-4)
The domain of the function is:
2x - 4> = 0
Clearing x we have:
2x> = 4
x> = 4/2
x> = 2
Equivalently:
[2, inf)
Answer:
The domain of the functions is not the same because the function g (x) includes the value of x = 2 in its domain.
The graph of f (x) does not include the value of x = 2 in its domain.
Answer: C
Step-by-step explanation: devision?
A ratio is a fraction which is technically a division problem.
Volume of Pyramid with Square Base =
..... Area of Base × (Height/3)
1. Calculate length of side
Perimeter of Square: 4S
4S=36
S = 9
2. Calculate Area of Square: S^2
9^2 = 81
3. Calculate Volume: Area of Base × (Height/3)
81(9/3)
81(3)
243
Volume is C. 243 cm^2
Answer:
1) We know that e is an irrational number, so we usually can find it by computational methods.
and we know that e accurate to 10 decimal points is:
e = 2.7182818285
2) Now we want to write the properties of the exponential and logarithmic functions.
We will write first the exponential property, and then the correspondent one for the logarithmic function.
(e^a)*(e^b) = e^(a + b)
The equivalent Ln property is:
Ln(a) + Ln(b) = Ln(a*b)
(e^a)/(e^b) = e^(a - b)
The eqivalent Ln property is:
Ln(a) - Ln(b) = Ln(a/b)
(e^a)^b = e^(a*b)
The equivalent Ln property is:
Ln(a^b) = b*Ln(a)