Answer:
1/16
Step-by-step explanation:
if you do Keep, Change, Flip, you get 1/16. So what you do is you lay out 1/4 divided by 4/1. You KEEP the first fraction, CHANGE the division sign into a multiplication sign, and then FLIP the 4/1 into 1/4. Then all you have to do is multiply 1 times 1, and then 4 times 4. Hope this helps :)
I was taught that you don't add numbers & letters together hope this helps
Answer:
113°F is the highest temperature and -67° is the lowest temperature.
Step-by-step explanation:
(45°C × 9/5) + 32 = 113°F
(-55°C × 9/5) + 32 = -67°F
Answer:
f(2) = 5
Step-by-step explanation:
<h3><u>
Definitions:</u></h3>
Input values = x-coordinates.
- The input values are also known as the <u>domain</u>, which is the set of all real numbers. With the domain of a function, you could substitute any real number into a given function for x and produce a valid output.
Output values = y-coordinates
- The <u>range</u> is the set of all real numbers that depend on the input values plugged into the function. Thus, the range represents the output (y-values) that corresponds to the input values used into the function.
<h3><u>
Function Notation:</u></h3>
- In the function notation f(x), <em>f</em> is the function name, and <em>x</em> is your <u>input variable</u>.
- <u>Output values</u> are also called <u>functional values.</u> You could use any letter to represent a function name, such as g(x), w(x), etc.,.
<h3><u>Explanations:</u></h3>
This particular question asks for you to identify the corresponding output (y-value) of the given input value, x = 2. If you look at the graph, the x-coordinate, x = 2, corresponds to the y-coordinate of 5.
Therefore, f(2) = 5.
Attached is an edited screenshot of the graph that you posted, where it shows where f(2) = 5 is located on the graph.
Answer:
Try coplanar, line
Step-by-step explanation:
Two lines are parallel lines if they are coplanar and do not intersect. Lines that are not coplanar and do not intersect are called skew lines. Two planes that do not intersect are called parallel planes.