Explain why f(x)=1/(x-3)^3 is not continuous at x=3

a) f is not defined at x= -3
b) f is not defined at x= 3
c) f is not defined at x = 0
d) f is not defined at x= 9

f(x)=1/(x-3)^3

The denominator can't be equal to zero (we can't divide by zero), then:
(x-3)^3 different 0
cubic root both sides:
cubic root [ (x-3)^3 ] different cubic root (0)
x-3 different 0
Adding 3 both sides:
x-3+3 different 0+3
x different 3

Then the function f is not defined at x=3

Answer: Option b) f is not defined at x= 3

Answer Link

milesbrush milesbrush · Answer 2 · 2021-05-07T16:15:54+02:00

milesbrush milesbrush

07-05-2021

Answer:

B

Step-by-step explanation: EDGE 2020

Answer Link

Explain why f(x)=1/(x-3)^3 is not continuous at x=3 a) f is not defined at x= -3 b) f is not defined at x= 3 c) f is not defined at x = 0 d) f is not defined at x= 9

Respuesta :

Otras preguntas

Explain why f(x)=1/(x-3)^3 is not continuous at x=3

a) f is not defined at x= -3
b) f is not defined at x= 3
c) f is not defined at x = 0
d) f is not defined at x= 9