All Algebra II Resources
Example Questions
Example Question #25 : Introduction To Functions
Domain: All real numbers
Range:
Domain: All real numbers
Range:
Domain: All real numbers
Range:
The domain includes the values that go into a function (the x-values) and the range are the values that come out (the or y-values). A sine curve represent a wave the repeats at a regular frequency. Based upon this graph, the maximum is equal to 1, while the minimum is equal to –1. The x-values span all real numbers, as there is no limit to the input fo a sine function. The domain of the function is all real numbers and the range is .
Example Question #1 : Range And Domain
Which of the following is NOT a function?
A function has to pass the vertical line test, which means that a vertical line can only cross the function one time. To put it another way, for any given value of , there can only be one value of . For the function , there is one value for two possible values. For instance, if , then . But if , as well. This function fails the vertical line test. The other functions listed are a line,, the top half of a right facing parabola, , a cubic equation, , and a semicircle, . These will all pass the vertical line test.
Example Question #1 : Domain And Range
Give the domain of the function below.
The domain is the set of possible value for the variable. We can find the impossible values of by setting the denominator of the fractional function equal to zero, as this would yield an impossible equation.
Now we can solve for .
There is no real value of that will fit this equation; any real value squared will be a positive number.
The radicand is always positive, and is defined for all real values of . This makes the domain of the set of all real numbers.
Example Question #2 : Domain And Range
Find the domain:
To find the domain, find all areas of the number line where the fraction is defined.
because the denominator of a fraction must be nonzero.
Factor by finding two numbers that sum to -2 and multiply to 1. These numbers are -1 and -1.
Example Question #4 : How To Find The Domain Of A Function
What is the domain of the function ?
The domain is the set of x-values that make the function defined.
This function is defined everywhere except at , since division by zero is undefined.
Example Question #3 : Domain And Range
If , which of these values of is NOT in the domain of this equation?
Using as the input () value for this equation generates an output () value that contradicts the stated condition of .
Therefore is not a valid value for and not in the equation's domain:
Example Question #1 : Domain And Range
What is the range of the function?
This function is a parabola that has been shifted up five units. The standard parabola has a range that goes from 0 (inclusive) to positive infinity. If the vertex has been moved up by 5, this means that its minimum has been shifted up by five. The first term is inclusive, which means you need a "[" for the beginning.
Minimum: 5 inclusive, maximum: infinity
Range:
Example Question #6 : Domain And Range
What is the domain of the function?
The domain represents the acceptable values for this function. Based on the members of the function, the only limit that you have is the non-allowance of a negative number (because of the square root). The square and the linear terms are fine with any numbers. You cannot have any negative values, otherwise the square root will not be a real number.
Minimum: 0 inclusive, maximum: infinity
Domain:
Example Question #4 : Domain And Range
What is the domain of the function?
The domain of a function refers to the viable value inputs. Common domain restrictions involve radicals (which cannot be negative) and fractions (which cannot have a zero denominator).
This function does not have any such restrictions; any value of will result in a real number. The domain is thus unlimited, ranging from negative infinity to infinity.
Domain:
Example Question #33 : Introduction To Functions
What is the range of the function?
This function represents a parabola that has been shifted 15 units to the left and 2 units up from its standard position.
The vertex of a standard parabola is at (0,0). By shifting the graph as described, the new vertex is at (-15,2). The value of the vertex represents the minimum of the range; since the parabola opens upward, the maximum will be infinity. Note that the range is inclusive of 2, so you must use a bracket "[".
Minimum: 2 (inclusive), maximum: infinity
Range: