| Your Results | Global Average | |
|---|---|---|
| Questions | 5 | 5 |
| Correct | 0 | 3.12 |
| Score | 0% | 62% |
This diagram represents two parallel lines with a transversal. If d° = 144, what is the value of x°?
| 144 | |
| 161 | |
| 16 | |
| 38 |
For parallel lines with a transversal, the following relationships apply:
Applying these relationships starting with d° = 144, the value of x° is 144.
When two lines intersect, adjacent angles are __________ (they add up to 180°) and angles across from either other are __________ (they're equal).
obtuse, acute |
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vertical, supplementary |
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supplementary, vertical |
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acute, obtuse |
Angles around a line add up to 180°. Angles around a point add up to 360°. When two lines intersect, adjacent angles are supplementary (they add up to 180°) and angles across from either other are vertical (they're equal).
If b = 6 and y = 8, what is the value of 9b(b - y)?
| -96 | |
| -84 | |
| -108 | |
| -24 |
To solve this equation, replace the variables with the values given and then solve the now variable-free equation. (Remember order of operations, PEMDAS, Parentheses, Exponents, Multiplication/Division, Addition/Subtraction.)
9b(b - y)
9(6)(6 - 8)
9(6)(-2)
(54)(-2)
-108
If side a = 3, side b = 3, what is the length of the hypotenuse of this right triangle?
| \( \sqrt{5} \) | |
| \( \sqrt{50} \) | |
| \( \sqrt{89} \) | |
| \( \sqrt{18} \) |
According to the Pythagorean theorem, the hypotenuse squared is equal to the sum of the two perpendicular sides squared:
c2 = a2 + b2
c2 = 32 + 32
c2 = 9 + 9
c2 = 18
c = \( \sqrt{18} \)
On this circle, a line segment connecting point A to point D is called:
circumference |
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radius |
|
chord |
|
diameter |
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).