The image below shows the current version of the United States flag. The flag has had 50 stars since the 50th state joined the United States of America.
Which of these was the 50th state to join the United States?
Virginia
Illinois
Hawaii
Massachusetts
Hawaii.
I need bot for this question please!
Use the function rule:f (x) 3x-2. Find the output f (1.5).
A:2.5
B:-2.5
C:6.5
D:-6.5
-Explain your answer
The answer is C: 6.5.
To find the output, we need to substitute the given input value into the function rule. So, f(1.5) means we need to replace x with 1.5 in the expression 3x-2.
f(1.5) = 3(1.5) - 2
f(1.5) = 4.5 - 2
f(1.5) = 2.5
Therefore, the output for the given input value is 2.5.
Which is a table of values for y=x-6?
Explain please
A table of values for y = x - 6 can be generated by substituting different input values of x into the expression and computing the corresponding output values of y.
For example:
| x | y |
|---|---|
| 0 | -6 |
| 1 | -5 |
| 2 | -4 |
| 3 | -3 |
| 4 | -2 |
In this table, each row represents a unique input-output pair. For instance, when x = 2, we substitute it into the expression y = x - 6 as follows:
y = 2 - 6 = -4
Therefore, the corresponding output value for x = 2 is y = -4.
By listing several input-output pairs in a table, we can see how the linear function y = x - 6 varies with different values of x. We can also plot these points on a graph and draw a straight line through them to visualize the relationship between x and y.
A | x | y |
|-5||1|
|-8||-14|
|-7||-13|
B| x | y |
|-5||-11|
|-8||-2|
|-7||-13|
C| x | y |
|-5||-11|
|-8||-14|
|-7||-13|
| x | y |
|-5||-1|
|-8||-2|
|-7||-1|
Which is a table of values for y=x-6?
Explain please! :)))
None of the given tables represents the linear function y = x - 6.
Table A has two variables, x and y, but the output y does not follow the rule of y = x - 6. For example, when x = -5, we should have y = -5 - 6 = -11, but the table shows y = 1 instead.
Table B also has two variables, x and y, but the output y does not follow the rule of y = x - 6. For example, when x = -8, we should have y = -8 - 6 = -14, but the table shows y = -2 instead.
Table C also has two variables, x and y, but the output y does not follow the rule of y = x - 6. For example, when x = -5, we should have y = -5 - 6 = -11, but the table shows y = -11 instead.
The last table has four columns, which makes it difficult to determine whether it represents the function y = x - 6. We cannot say for sure whether it is the correct table for y = x - 6 or not.
Therefore, the given tables do not contain the correct values for the function y = x - 6.