What is the domain of a function generally defined as?
Understanding Domains of Functions
Interactive Video
•
Mathematics
•
9th - 12th Grade
•
Hard
Jackson Turner
FREE Resource
The video tutorial explains how to determine the domain of different types of functions. It starts with a rational function, highlighting the need to avoid division by zero. Next, it covers square root functions, emphasizing the requirement for non-negative values under the radical. Finally, it discusses polynomial functions, which have no domain constraints, as they can accept any real number.
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10 questions
Show all answers
1.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
All possible values that make the function infinite
All possible values that make the function zero
All possible x-values that give a valid output
All possible y-values of the function
2.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
For the function f(x) = (x + 5) / (x - 2), what value must x not be equal to?
x = -5
x = 0
x = 5
x = 2
3.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
Why must x not equal 2 in the function f(x) = (x + 5) / (x - 2)?
It would make the function positive
It would make the function negative
It would make the denominator zero
It would make the numerator zero
4.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
For the function g(x) = √(x - 7), what is the minimum value x can take?
x = 14
x = 0
x = 7
x = -7
5.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
Why must x be greater than or equal to 7 in the function g(x) = √(x - 7)?
To ensure the function is always negative
To ensure the function is always positive
To avoid a zero value under the square root
To avoid a negative value under the square root
6.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
What is the domain of the function h(x) = (x - 5)^2?
All real numbers
x = 5
x < 5
x > 5
7.
MULTIPLE CHOICE QUESTION
30 sec • 1 pt
Why does the function h(x) = (x - 5)^2 have a domain of all real numbers?
Because squaring any real number results in a real number
Because it has a denominator
Because it involves a square root
Because it is a linear function
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