The answer is a translation of 2 units to the left and 7 units up
A is the minimum value
B is the first quartile
The point with the line through it (next to C) is the median.
The point to the outside of the box is the third quartile.
D is the maximum value.
Hope this helped.
<h3>===> Exercise 1</h3>
Add 8 to both sides.
Add 7 and 8 to get 15.
Divide both sides by 3.
Divide 15 by 3 to get 5.
<h3>===> Exercise 2</h3>
Subtract 9 from both sides.
Subtract 9 from −15 to get −24.
Divide both sides by 8.
Divide −24 entre 8 para obtener −3.
<h3>===> Exercise 3</h3>
Swap the sides so that all the terms of the variables are on the left side.
Add 13 to both sides.
Add 8 and 13 to get 21.
Divide both sides by 3.
Divide 21 by 3 to get 7.
<h3>===> Exercise 4</h3>
Subtract 22 from both sides.
Subtract 22 from 4 to get −18.
Divide both sides by 6.
Divide −18 entre 6 para obtener −3.
<h3>
===> Excercise 5</h3>
Swap the sides so that all the terms of the variables are on the left side.
Subtract 51 from both sides.
Subtract 51 from 84 to get 33.
Divide both sides by 11.
Divide 33 by 11 to get 3.
Answer:
A, D, & F
Step-by-step explanation:
When you distribute, you get 6a + 5a + 5 - 3a + 21.
After combining like terms, you get 8a + 26.
Lastly, all you have to do is figure out which expressions are equivalent to
8a + 26.
A) 8a + 26 = 8a + 26
D) 6a + 5a + 5 - 3a + 21 (combine like terms) = 8a + 26
F) 2(4a + 13) - Simple distribution
2 x 4a = 8a
2 x 13 = 26
2(4a + 13) = 8a + 26
