Expressions & Equations Review

Numerical Expressions

Verbal Expressions

Algebraic Expressions

Equivalent Expressions

Inequalities

100

Write and evaluate the numerical expression for "3 squared plus 5."

Then evaluate.

Expression: 3²+5

Value: 9+5=14

100

Translate to a numerical expression: "Seven more than x."

x+7

100

Identify the variable and what it could represent: 5x in the problem "it costs $5 per pack of pens at the store."

Variable: x; represents number of pens in one pack

100

Use the distributive property to rewrite 3(2+x) as an equivalent expression.

6+3x

100

Write an inequality to represent: "x is greater than 7." Then show its solution on a number line (remember dot and arrow).

Inequality: x>7.

On number line: open circle at 7, arrow shading to the right

200

Evaluate the expression 4²+2×3 following order of operations.

200

Translate to words: 3n−5

"Three times a number n minus five."

200

Evaluate 7a+2 when a=3.

7(3)+2=

21+2=

200

Combine like terms to simplify: 4x+3x.

200

Determine whether the number 5 makes the inequality x+2<8 true.

Check: 5+2<8

7<8

true

300

Write a numerical expression that uses a whole-number exponent to represent "the cube of 2 plus 7." Evaluate it.

2³+7=

8+7=

15.

300

Translate to a numerical expression: "The product of 4 and the sum of 2 and y."

4(2+y)

300

Use substitution to determine whether x=4 makes the equation 2x+3=11 true

2(4)+3=11, so yes, true.

300

Apply distributive property and combine like terms to simplify: 2(3x+4)+x

2(3x+4)+x=

6x+8+x=

7x+8

300

Write an inequality for: "A student needs at least 60 points to pass; let p be the student's points." Represent the solution set in words.

Inequality: p≥60. Solution in words: all scores 60 or higher pass.

400

Evaluate 2³×3+5²

Show the order you used.

2³×3+5²=

8×3+25=

24+25=

400

Write a verbal expression for 2(3+m)−4.

"Two times the sum of 3 and m, minus 4"

400

Represent this real-world situation with an expression: "A movie ticket costs $8. Snacks cost $y. Write an expression for the total cost of one ticket and snacks." Then evaluate when y=5.

8+y. If y=5: 8+5=13

400

Show two different equivalent expressions for y+y+y and explain why they are equivalent.

Equivalent expressions: 2y+y and 3y; they are equivalent because both equal three times y for any y.

400

Solve and graph the inequality: x−4>3. State the solution set and show how you would draw it on a number line.

Solve: x−4>3⇒x>7

Graph: open circle at 7, shade right.

500

A formula gives the area of a square as A=s². If s=6, write the numerical expression and evaluate to find A.

A=6²=36.

500

Translate to an algebraic expression: "Twice the difference of a number n and 6, increased by 3." Then evaluate when n=10.

Expression: 2(n−6)+3.

When n=10: 2(4)+3=

8+3=

500

The expression 1/2 𝑎(𝑏+𝑐) can be used to find the area of a trapezoid. What is the area of the trapezoid when a = 6.5, b = 5, and c = 5.4?

33.8 ft²

500

Rewrite and simplify 6(2x+3)+4x fully by applying properties of operations.

6(2x+3)+4x=

12x+18+4x=

16x+18

500

A store requires that a purchase be less than $50. Write an inequality for the price p. Explain why this inequality has infinitely many solutions.

Inequality: p<50.

Infinitely many solutions because any number less than 50 (including decimals) works; examples: 49, 10, 0.