FREE ATI TEAS 7 Math Practice Test

Welcome to our FREE ATI TEAS 7 Math practice test, with answer key and answer explanations. This practice test’s realistic format and high-quality practice questions can help you succeed on the ATI TEAS 7 Math test. Not only does the test closely match what you will see on the real ATI TEAS 7, but it also comes with detailed answer explanations.

For this practice test, we’ve selected 20 real questions from past exams for your ATI TEAS 7 Practice test. You will have the chance to try out the most common ATI TEAS 7 Math questions. For every question, there is an in-depth explanation of how to solve the question and how to avoid mistakes next time.

Use our free ATI TEAS 7 Math practice tests and study resources (updated for 2022) to ace the ATI TEAS 7 Math test! Make sure to follow some of the related links at the bottom of this post to get a better idea of what kind of mathematics questions you need to practice.

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10 Sample ATI TEAS 7 Math Practice Questions

1- If a rectangle is 30 feet by 45 feet, what is its area?

A. 1,350

B. 870

C. 1,000

D. 1,250

2- If \(x\) is \(25\%\) percent of 250, what is \(x\)?

A. 35

B. 95.5

C. 62.5

D. 150

3- The width of a garden is \(5.48\) yards. How many meters is the width of that garden?

A. 5.01 m

B. 301.1 m

C. 57.4 m

D. 195.1 m

4- The oven temperature reaches \(55^\circ\)C. what’s is the temperature in degrees Fahrenheit?
\(C =\frac{5}{9} (F -32)\)

A. \(55^\circ\) F

B. \(131^\circ\) F

C. \(77^\circ\) F

D. \(95^\circ\) F

5- How many meters is \(27356\) centimeters?

A. 27.356 m

B. 2.735600 m

C. 273.5600 m

D. 2735.600 m

6- If a rectangular swimming pool has a perimeter of 112 feet and is 22 feet wide, what is its area?

A. 1,496

B. 90

C. 2,464

D. 748

7- Find the mean of 112, 420, 322, 176, 390, and 235.

A. 250.5

B. 275.833 …

C. 277.5

D. 292

8- Solve the proportion \(\frac{2.5}{3.2}=\frac{x}{5.6}\).

A. 3.457

B. 1.745

C. 2.547

D. 4.375

9- The equation of a line is given as \(y = 5x – 3\). Which of the following points does not lie on the line?

A. \((1, 2)\)

B. \((–2, –13)\)

C. \((3, 18)\)

D. \((2, 7)\)

10- If two angles in a triangle measure 50 degrees and 42 degrees, what is the value of the third angle?

A. 88 Degrees

B. 42 Degrees

C. 92 Degrees

D. 112 Degrees

11- Ella (E) is 4 years older than her friend Ava (A) who is 3 years younger than her sister Sofia (S). If E, A, and S denote their ages, which one of the following represents the given information?

A. \(\begin{cases}E=A+4\\S=A-3\end{cases}\)

B. \(\begin{cases}E=A+4\\A=S+3\end{cases}\)

C. \(\begin{cases}A=E+4\\S=A-3\end{cases}\)

D. \(\begin{cases}E=A+4\\A=S-3\end{cases}\)

12- Which of the following point is the solution of the system of equations?
\(\begin{cases}-2x- y = -9\\5x-2y= 18\end{cases}\)

A. \((-1, 2)\)

B. \((4, 1)\)

C. \((1, 4)\)

D. \((4, -2)\)

13- A number is chosen at random from 1 to 25. Find the probability of not selecting a composite number.

A. \(\frac{9}{25}\)

B. \(25\)

C. \(\frac{2}{5}$\)

D. \(1\)

14- Last Friday Jacob had $32.52. Over the weekend he received some money for cleaning the attic. He now has $44. How much money did he receive?

A.  $76.52

B. $11.48

C. $32.08

D. $12.58

15- Simplify : \(\frac{\frac{1}{2}-\frac{x+5}{4}}{\frac{x^2}{2}-\frac{5}{2}}\)

A. \(\frac{3 – x}{x^2 – 10}\)

B. \(\frac{3 – x}{2x^2 – 10}\)

C. \(\frac{3 + x}{x^2 – 10}\)

D. \(\frac{-3 – x}{2x^2 – 10}\)

16- In the simplest form, \(\frac{26}{14}\) equals to:

A. \(\frac{3}{7}\)

B. \(\frac{7}{3}\)

C. \(\frac{13}{7}\)

D. \(\frac{7}{13}\)

17- \(\frac{13}{23}\) is equal to:

A. 5.20

B. 0.52

C. 0.05

D. 0.50

18- What is the sum of 231.07, 729.41, and 302.13?

A. 1,126.16

B. 1,622.061

C. 1,262.61

D. 1,226.06

19- A circle has a diameter of 3.8 inches. What is its approximate circumference?

A. 11

B. 12

C. 13

D. 14

20- What is 8923.2769 rounded to the nearest tenth?

A. 8923.3

B. 8923.277

C. 8923

D. 8923.27

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Answers:

2- C
\(\frac{25}{100} × 250 = 62.5\)

3- A
\(m=\frac{yd}{1.0936}\)
\(m=\frac{5.48}{1.0936}== 5.010912\)

4- B
\(C =\frac{5}{9} (F -32)\)
\(495 = 5F – 160\)
\(495 + 160 = 5F \)
\(\frac{495+ 160}{5}=F\)
\(\frac{655 }{5}=F\)
\(F=131\)

5- C
\(27356 × 0.01 = 273.56\)

6- D
\(P = 2(x + y)\)
\(A = x .y\)
\(P = 2(x + y) → 112 = 2(22 + y) →112 = 44 + 2y→ 68 = 2y → y = 34\)
\(A = 22 × 34 = 748\)

7- B
Mean=\(\frac{sum \space of \space the \space data}{of \space data \space entires}=\frac{112+ 420+ 322+176+ 390+235}{6}=\frac{1655}{6}= 275.833\)

8- D
\(\frac{2.5}{3.2}=\frac{x}{5.6}\)
\(x=\frac{2.5 ×5.6}{3.2}=\frac{14}{3.2}== 4.375\)

9- C
Let’s review the choices provided. Put the values of x and y in the equation.
A. (1, 2) ⇒ \(x = 1 ⇒ y = 2\) This is true!
B. (−2, −13) ⇒ \(x = -2 ⇒ y = -13\) This is true!
C. (3, 18) ⇒ \(x = 3 ⇒ y = 12\) This is not true!
D. (2, 7) ⇒ \(x = 2 ⇒ y = 7\) This is true!

10- A
\(50^\circ + 42^\circ = 92^\circ\)
\(180^\circ – 92^\circ = 88^\circ\)

11- D
\(E = 4 + A\)
\(A = S – 3\)

12- B
\(\begin{cases}-2x- y = -9\\5x-2y= 18\end{cases}\)
⇒ Multiplication (–2) in first equation ⇒
\(\begin{cases}4x +2y =18\\5x-2y= 18\end{cases}\)
Add two equations together ⇒ \(9x =36 ⇒ x= 4\) then:
\(y = 1\)

13- A
\(\frac{9}{25}\)

14- B
\($44 – $32.52 = 11.48\)

15- D
\(\frac{\frac{1}{2}-\frac{x+5}{4}}{\frac{x^2}{2}-\frac{5}{2}}=\frac{\frac{1}{2}-\frac{x+5}{4}}{\frac{x^2-5}{2}}\)
\(\frac{2(\frac{1}{2}-\frac{x+5}{4})}{x^2-5}\)
⇒Simplify:
\(\frac{1}{2}-\frac{x+5}{4}=\frac{- x – 3}{4}\)
Then:
\(\frac{2(\frac{-x-3}{4})}{x^2-5}=\frac{\frac{-x-3}{2}}{x^2-5}=\frac{-x – 3}{2(x^2 – 5)}=\frac{-x – 3}{2x^2 – 10}\)

16- C
\(\frac{26}{14}=\frac{13}{7}\)

17- B
\(\frac{13}{23}=0.52\)

18- C
\(231.07 + 729.41 + 302.13 = 1262.61\)

19- B
Diameter \(= 2r ⇒ 3.8 = 2r ⇒ r = 1.9\)
Circumference \(= 2πr ⇒ C = 2π(1.9) ⇒ C = 3.8π = 11.932 \cong 12\)

20- A
\(8923.3\)

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