Answer:
They would have to order 4 more uniforms in order to distribute an equal amount to each employee
Step-by-step explanation:
First we have to calculate the number of maximum uniforms that can be given to each employee equally
For this we simply divide the number of uniforms by the number of employees and look only at the whole number
980/41 = 23.92 = 23
we don't round we just take the decimals
now we multiply the number of maximum uniforms that we can give each one by the number of employees
23 * 41 = 943
to the 980 uniforms we subtract the 943
980 - 943 = 37
Calculate how much is left to 37 to reach 41
41 - 37 = 4
This means that they would have to order 4 more uniforms in order to distribute an equal amount to each employee
Brainly doesn't support all the characters put in so I had to resort to a different program and then send it in as an attachment
Answer:
I can't see the side lengths so I can't answer it
Step-by-step explanation:
Answer:
2.29
Step-by-step explanation:
First determine the square root of 17.8
√17.8 = 4.22
second, determine the value of 
= 1.93
subtract 1.93 from 4.22
4.22 - 1.93 = 2.29
Answer:
<h3>Graph 3</h3>
Line starting at x = -2
- <u>Domain</u>: x ≥ -2
- <u>Range</u>: y ≥ 0
<h3>Graph 4</h3>
Vertical line
- <u>Domain</u>: x = 3
- <u>Range</u>: y = any real number
<h3>Graph 5</h3>
Quadratic function with negative leading coefficient and max value of 3
- <u>Domain</u>: x = any real number
- <u>Range</u>: y ≤ 3
<h3>Graph 6</h3>
Curve with non-negative domain and min value of -2
- <u>Domain</u>: x ≥ 0
- <u>Range</u>: y ≥ -2
<h3>Graph 7</h3>
Line with no restriction
- <u>Domain</u>: x = any real number
- <u>Range</u>: y = any real number
<h3>Graph 8</h3>
Quadratic function with positive leading coefficient and min value of 4
- <u>Domain</u>: x = any real number
- <u>Range</u>: y ≥ 4
<h3>Graph 9</h3>
Parabola with restriction at x = -4
- <u>Domain</u>: x = any real number except -4
- <u>Range</u>: y = any real number
<h3>Graph 10</h3>
Square root function with star point (2, 0)
- <u>Domain</u>: x ≥ 2
- <u>Range</u>: y ≥ 0
