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The table shows all the possible outcomes for spinning the pointer of a spinner with four equal-sized sections labeled 1-4 and another spinner
with four equal-sized sechons labeled A-D. What is the probability that the two pointers will land on an odd number and the letter C? Give the
probability as a percent. Enter your answer in the box
1 1.A 1.B 1.C 1.D
1 2.A 2.B 2. C 2.D
3 3.A 3.B 3.C 3.D
P(odd number,C) = ( %)

Question

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Respuesta :

andriansp andriansp · Answer 1 · 2020-03-29T12:43:20+02:00

Answer:

12.5%

Step-by-step explanation:

There are two types of spinners here and the outcome of them is independent. That means

P(odd number,C) = P(odd number) * P(C)

There are two odd numbers out of four numbers in the first spinner. The chance of odd number will be:

P(odd) = 2/(2+2)= 1/2= 50%

There are four letters and the desired outcome is C. The chance for C will be:

P(C)= 1/4= 25%

Then the chance will be:

P(odd number,C) = P(odd number) * P(C)

P(odd number,C) =50% * 25% = 12.5%

topeadeniran2 topeadeniran2 · Answer 2 · 2022-04-19T12:50:33+02:00

The probability that the two pointers will land on an odd number and the letter C is 12.5%.

From the information given, the chance of the odd number will be:

= 2/(2 + 2)

= 2/4 = 50%

The chance for C will be:

= 1/4 = 25%

Therefore, the probability that the two pointers will land on an odd number and the letter C will be:

= 50% × 25%

= 12.5%

Learn more about probability on:

https://brainly.com/question/24756209