Problem 1:
The function f has the domain of set of numbers with absolute value less than 11 and is defined by f(x) = 4/x+14 ; the function g has the domain of interval (-b,b) and is defined by g(x) = 4/x+14. Find a number b such that the function f equals the function g.
Problem 2:
Suppose that h is defined by h(t) = |t| + 1. What is the range of h if the domain of h is the interval [-7, 5]?
Choose the correct interval for the range of h.
a) (1,8)
b) [1,8]
c) [-7,5]
d) (-7,5)
e) (1,8]
An explanation to the answer would be great! Thank you!
The function f has the domain of set of numbers with absolute value less than 11 and is defined by f(x) = 4/x+14 ; the function g has the domain of interval (-b,b) and is defined by g(x) = 4/x+14. Find a number b such that the function f equals the function g.
Problem 2:
Suppose that h is defined by h(t) = |t| + 1. What is the range of h if the domain of h is the interval [-7, 5]?
Choose the correct interval for the range of h.
a) (1,8)
b) [1,8]
c) [-7,5]
d) (-7,5)
e) (1,8]
An explanation to the answer would be great! Thank you!