| Your Results | Global Average | |
|---|---|---|
| Questions | 5 | 5 |
| Correct | 0 | 3.17 |
| Score | 0% | 63% |
What is 6a + 9a?
| 54a | |
| 15a | |
| 15 | |
| -3 |
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.
6a + 9a = 15a
On this circle, line segment CD is the:
diameter |
|
circumference |
|
chord |
|
radius |
A circle is a figure in which each point around its perimeter is an equal distance from the center. The radius of a circle is the distance between the center and any point along its perimeter. A chord is a line segment that connects any two points along its perimeter. The diameter of a circle is the length of a chord that passes through the center of the circle and equals twice the circle's radius (2r).
Solve for y:
-3y - 8 = \( \frac{y}{-7} \)
| -1\(\frac{1}{63}\) | |
| 1\(\frac{5}{13}\) | |
| -2\(\frac{4}{5}\) | |
| 1\(\frac{13}{23}\) |
To solve this equation, repeatedly do the same thing to both sides of the equation until the variable is isolated on one side of the equal sign and the answer on the other.
-3y - 8 = \( \frac{y}{-7} \)
-7 x (-3y - 8) = y
(-7 x -3y) + (-7 x -8) = y
21y + 56 = y
21y + 56 - y = 0
21y - y = -56
20y = -56
y = \( \frac{-56}{20} \)
y = -2\(\frac{4}{5}\)
If a = 7, b = 6, c = 4, and d = 7, what is the perimeter of this quadrilateral?
| 29 | |
| 25 | |
| 24 | |
| 13 |
Perimeter is equal to the sum of the four sides:
p = a + b + c + d
p = 7 + 6 + 4 + 7
p = 24
Solve for c:
c - 4 < -3 + 3c
| c < 3\(\frac{1}{2}\) | |
| c < \(\frac{7}{8}\) | |
| c < -\(\frac{1}{2}\) | |
| c < \(\frac{1}{2}\) |
To solve this equation, repeatedly do the same thing to both sides of the equation until the variable is isolated on one side of the < sign and the answer on the other.
c - 4 < -3 + 3c
c < -3 + 3c + 4
c - 3c < -3 + 4
-2c < 1
c < \( \frac{1}{-2} \)
c < -\(\frac{1}{2}\)