Posted by Jason Roberj1 on Thursday, December 8, 2016 at 11:30am.

1. Which number is a solution of the inequality

G > 6.4

A 7
B 6
C 6.4
D -7

2. Which number is a solution of the inequality

y+2>8

A -5
B -6
C 6
D 7

3. which number is A solution of the inequality

6>z(10-z)

A 0
B 1
C 2
D 3

4. Choose the correct solution and graph for the inequality

y-5≤-8

A y≤-13
B y≥-3
C y≥-13
D y≤-3

5. Choose the correct solution and graph for the inequality

x-3≤2

A x≥5
B x≤-1
C x≤5
D x≥-6

Number 5 bobpursley

DO NOT PUT WHAT BRYANT SAYS

1. To determine which number is a solution of the inequality G > 6.4, we need to find a number that is greater than 6.4.

To solve this inequality, we exclude the equal sign and solve for G.

G > 6.4

The answer choices are: A) 7, B) 6, C) 6.4, and D) -7.

We can see that option A) 7 is greater than 6.4. Therefore, the correct answer is A) 7.

2. To find the solution of the inequality y + 2 > 8, we need to find a number that, when added to 2, is greater than 8.

Subtracting 2 from both sides of the inequality, we get:

y > 8 - 2
y > 6

The answer choices are: A) -5, B) -6, C) 6, and D) 7.

We can see that option C) 6 is greater than 6. Therefore, the correct answer is C) 6.

3. To determine which number is a solution of the inequality 6 > z(10 - z), we need to find a value of z that satisfies this inequality.

Expanding the equation, we have:

6 > 10z - z^2

Rearranging the terms, we have:

z^2 - 10z + 6 < 0

To solve this quadratic inequality, we need to find the values of z that make the expression less than zero.

The answer choices are: A) 0, B) 1, C) 2, and D) 3.

We can use a graph or algebraic methods to solve this inequality. Considering that the parabola of the quadratic equation opens downwards (negative leading coefficient), we can determine that the values of z that make the expression less than zero are between the roots of the equation.

Finding the roots by factoring or using the quadratic formula, we find the roots to be approximately 0.38197 and 9.61803.

Therefore, the correct solution is a value of z between 0 and 1, inclusive. So, the correct answer is B) 1.

4. To solve the inequality y - 5 ≤ -8, we need to find a value of y that satisfies this inequality.

Adding 5 to both sides of the inequality, we get:

y ≤ -3

The answer choices are: A) y ≤ -13, B) y ≥ -3, C) y ≥ -13, and D) y ≤ -3.

Option D) y ≤ -3 satisfies the inequality. Therefore, the correct answer is D) y ≤ -3.

5. To solve the inequality x - 3 ≤ 2, we need to find a value of x that satisfies this inequality.

Adding 3 to both sides of the inequality, we get:

x ≤ 5

The answer choices are: A) x ≥ 5, B) x ≤ -1, C) x ≤ 5, and D) x ≥ -6.

Option C) x ≤ 5 satisfies the inequality. Therefore, the correct answer is C) x ≤ 5.

Hey I didn't see anybody doing it so I decided to help others! The answer to the quiz is:

1. C
2. C
3. A
4. C
5. C
6. C
7. D

For me it is correct but I do NOT know for all of you. I will not be held responsible for ANY of the misfortunes you get if you decide to do these answer. Good luck and pass the year!

Wrong "guess", Jason

why did you pick D ?

What is your answer for 5?

OK, now good. What are your answers you want us to check? We are not going to do the test for you...