The probability that he selected the special quarter is 87.5%.
<h3><u /></h3><h3><u>Probability</u></h3>
Given that Mandvil has one standard quarter and one special quarter with a Head on both sides, and he selects one of these two coins at random, and without looking at it first, he flips the coin three times, to determine, if he flips a Head three straight times, what is the probability that he selected the special quarter, the following calculation must be made:
- 1 - (standard quarter) = X
- 1 - (0.50^3) = X
- 1 - 0.125 = X
- 0.875 = X
- 0.875 x 100 = 87.5
Therefore, the probability that he selected the special quarter is 87.5%.
Learn more about probability in brainly.com/question/24217562
Answer:
Step-by-step explanation:
we have
Solve for the variable e
That means -----> Isolate the variable e
Multiply by e both sides
tex](e)t=\frac{4u}{e}(e)[/tex]
Divide by t both sides
Answer:
119.30
Step-by-step explanation:
119.30 rounded to the nearest hundredth is 119.30 because 0 is in the hundredth place, and there is no thousandths
Answer:
15% markdown
Step-by-step explanation:
To find the percent markdown
Take the original price minus the new price
975-828.75
146.25
Divide by the original price
146.25/975
.15
Change to percent form
15% markdown
