ASVAB Math Knowledge Practice Test 295982 Results

Your Results Global Average
Questions 5 5
Correct 0 3.21
Score 0% 64%

Review

1

Order the following types of angle from least number of degrees to most number of degrees.

75% Answer Correctly

acute, right, obtuse

right, obtuse, acute

acute, obtuse, right

right, acute, obtuse


Solution

An acute angle measures less than 90°, a right angle measures 90°, and an obtuse angle measures more than 90°.


2

The dimensions of this cube are height (h) = 1, length (l) = 9, and width (w) = 2. What is the surface area?

51% Answer Correctly
58
146
92
124

Solution

The surface area of a cube is (2 x length x width) + (2 x width x height) + (2 x length x height):

sa = 2lw + 2wh + 2lh
sa = (2 x 9 x 2) + (2 x 2 x 1) + (2 x 9 x 1)
sa = (36) + (4) + (18)
sa = 58


3

If the area of this square is 1, what is the length of one of the diagonals?

68% Answer Correctly
7\( \sqrt{2} \)
6\( \sqrt{2} \)
\( \sqrt{2} \)
5\( \sqrt{2} \)

Solution

To find the diagonal we need to know the length of one of the square's sides. We know the area and the area of a square is the length of one side squared:

a = s2

so the length of one side of the square is:

s = \( \sqrt{a} \) = \( \sqrt{1} \) = 1

The Pythagorean theorem defines the square of the hypotenuse (diagonal) of a triangle with a right angle as the sum of the squares of the other two sides:

c2 = a2 + b2
c2 = 12 + 12
c2 = 2
c = \( \sqrt{2} \)


4

For this diagram, the Pythagorean theorem states that b2 = ?

47% Answer Correctly

c - a

c2 + a2

a2 - c2

c2 - a2


Solution

The Pythagorean theorem defines the relationship between the side lengths of a right triangle. The length of the hypotenuse squared (c2) is equal to the sum of the two perpendicular sides squared (a2 + b2): c2 = a2 + b2 or, solved for c, \(c = \sqrt{a + b}\)


5

What is 9a - 2a?

79% Answer Correctly
7a
11
a2
18a

Solution

To combine like terms, add or subtract the coefficients (the numbers that come before the variables) of terms that have the same variable raised to the same exponent.

9a - 2a = 7a