GCF = 20
Reduce the fraction by dividing
the numerator and denominator by 20
and get the simplified answer
<span><span>20 ÷ 20=1 || 80 ÷ 20</span>=4
<em>1/4</em> is your answer! :D</span>
Answer:
if it's that way then it's -0.6
but if it's the other way then it's -1.65
Answer:
0.263 = 79/300
0.263 = 29/110
0.263 = 263/999
Step-by-step explanation:
To find out what is 0.263… as a fraction, identify the repeating sequence or pattern, known as reptend or repetend of 0.263 recurring.
The infinitely-repeated digit sequence of 0.263… can be indicated by three periods. For example, 0.26333… as a fraction (repeating 3, the last digit) = 79/300.
Alternatively, a vinculum, that is a horizontal line, can be drawn above the repetend of the fraction of 0.263. In addition, one can sometimes see the period enclosed in parentheses ().
Here, we use the overlined notation to denote 0.263 repeating as a fraction:
0.263 = 79/300
0.263 = 29/110
0.263 = 263/999
Answer:
Step-by-step explanation:
From the given question,
a). m∠WAX = 60°
If m(arc WX) = 100°
Then by theorem,
Angle formed between the chords in a circle, measures the half of the sum of intercepted arcs.
m(∠WAX) = ![\frac{1}{2}(\text{arc WX + arcYZ})](https://tex.z-dn.net/?f=%5Cfrac%7B1%7D%7B2%7D%28%5Ctext%7Barc%20WX%20%2B%20arcYZ%7D%29)
60° = ![\frac{1}{2}(100+\text{arcYZ})](https://tex.z-dn.net/?f=%5Cfrac%7B1%7D%7B2%7D%28100%2B%5Ctext%7BarcYZ%7D%29)
120 = 100 + arc YZ
120 - 100 = arc YZ
m(arc YZ) = 20°
b). m(arc WX + arc YZ) = 2(60°)
m(arc WX + arc YZ) = 120°
The answer is c. The amplitude of y=2 sin