Which of the p-values satisfy the following inequality? 5 >= 2p+1 Choose all answers that apply: A p=0 B p=1 c. p=2

Understand the inequality: Understand the inequality. We need to find the values of p that satisfy the inequality 5 >= 2p + 1.Isolate the variable p: Isolate the variable p on one side of the inequality. Subtract 1 from both sides of the inequality to get: 5 - 1 >= 2p 4 >= 2pDivide to solve for p: Divide both sides of the inequality by 2 to solve for p. 4 / 2 >= 2p / 2 2 >= p This means that p must be less than or equal to 2.Test each answer choice: Test each answer choice to see if it satisfies the inequality p <= 2. A. p = 0: Since 0 is less than 2, this choice satisfies the inequality. B. p = 1: Since 1 is less than 2, this choice also satisfies the inequality. C. p = 2: Since 2 is equal to 2, this choice satisfies the inequality as well.

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Which of the
p-values satisfy the following inequality?

5 >= 2p+1
Choose all answers that apply:
A
p=0
B
p=1
c.
p=2

Which of the $p$ -values satisfy the following inequality? $\newline$ $5 \geq 2 p+1$ $\newline$ Choose all answers that apply: $\newline$ A $p=0$ $\newline$ B $p=1$ $\newline$ C $p=2$

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Math Problems

Grade 8

Solutions to inequalities

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Q. Which of the

p

-values satisfy the following inequality?

\newline

5 \geq 2 p+1

\newline

Choose all answers that apply:

\newline

p=0

\newline

p=1

\newline

p=2

Understand the inequality: Understand the inequality. $\newline$ We need to find the values of $p$ that satisfy the inequality $5 \geq 2p + 1$ .
Isolate the variable $p$ : Isolate the variable $p$ on one side of the inequality. $\newline$ Subtract $1$ from both sides of the inequality to get: $\newline$ $5 - 1 \geq 2p$ $\newline$ $4 \geq 2p$
Divide to solve for $p$ : Divide both sides of the inequality by $2$ to solve for $p$ . $\frac{4}{2} \geq \frac{2p}{2}$ $2 \geq p$ This means that $p$ must be less than or equal to $2$ .
Test each answer choice: Test each answer choice to see if it satisfies the inequality $p \leq 2$ . $\newline$ A. $p = 0$ : Since $0$ is less than $2$ , this choice satisfies the inequality. $\newline$ B. $p = 1$ : Since $1$ is less than $2$ , this choice also satisfies the inequality. $\newline$ C. $p = 2$ : Since $2$ is equal to $2$ , this choice satisfies the inequality as well.