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3 years ago

Which description of a figure and its image match the transformation described by (x,y) → (2x, 2y + 1)?

Mathematics

1 answer:

guajiro [1.7K]3 years ago

8 0

Answer: The figure and its image are congruent and the image has been translated 1 unit to the right.

Step-by-step explanation:

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A percent is a fraction whose denominator is 100.

Softa [21]

That is partially a true statement. The percent is the numerator of the fraction who's denominator is 100.

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3 years ago

Need math helpppppp pls:)

Arisa [49]

Answer:

Similar AA

Step-by-step explanation:

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3 years ago

Please help!!!!! <br> Which defines the piecewise function shown?

denis-greek [22]

<h2>Hello!</h2>

The answer is:

The second piecewise function,

$f(x)=\left \{ {{-x-2,x$

To answer the question, we need to find which piecewise function contains the graphs shown in the picture, we have that first line shown, is decreasing and exists from the negative numbers to 0, and the line cuts the x-axis and the y-axis at "-2", for the second line shown, we have that is decreasing but exists from 0 (including it) to the the positive numbers.

So, finding which piecewise satisfies the function shown, we have:

- First piecewise function:

$f(x)=\left \{ {{-x-2,x$

First line,

We have the first line,

$-x-2$

The variable has a negative coefficient (-1), meaning that the function (line) is decreasing, also we can see that the function does exists from all the numbers less than 0, to 0, and it cuts the x-axis at -2 and the y-axis at -2.

Second line,

$\frac{x}{2}\geq 0$

The variable has positive coefficient, meaning that the function (line) is increasing.

Hence, since the second line is not decreasing, the piecewise function is not the piecewise function shown in the picture.

- Second piecewise function,

$f(x)=\left \{ {{-x-2,x$

First line,

We have the first line,

$-x-2$

The variable has a negative coefficient (-1), meaning that the function (line) is decreasing, also we can see that the function does exist from all the numbers less than 0, to 0.

Second line,

$-\frac{x}{2}\geq 0$

The variable has a negative coefficient ( $(-\frac{1}{2})$ , meaning the the unction (line) is decreasing, also we can see that the function does exists from 0 (including it) to the positive numbers.