charlottes breakfast goodies recorded how many of each type of muffin it recently sold. pumpkin spice…

charlottes breakfast goodies recorded how many of each type of muffin it recently sold. pumpkin spice muffins 3 blueberry muffins 4 bran muffins 4 blackberry muffins 7 what is the experimental probability that the next muffin sold will be a pumpkin spice muffin? write your answer as a fraction or whole number. p(pumpkin spice muffin) =

charlottes breakfast goodies recorded how many of each type of muffin it recently sold. pumpkin spice muffins 3 blueberry muffins 4 bran muffins 4 blackberry muffins 7 what is the experimental probability that the next muffin sold will be a pumpkin spice muffin? write your answer as a fraction or whole number. p(pumpkin spice muffin) =

Answer

Explanation:

Step1: Calculate the total number of muffins sold.

Add the number of each type of muffin sold: $$ 3 (\text{pumpkin spice}) + 4 (\text{blueberry}) + 4 (\text{bran}) + 7 (\text{blackberry}) = 18 $$ The total number of muffins sold is 18.

Step2: Identify the number of pumpkin spice muffins sold.

From the table, the number of pumpkin spice muffins sold is 3.

Step3: Calculate the experimental probability.

The experimental probability of an event is the ratio of the number of times the event occurred to the total number of trials. $$ P(\text{pumpkin spice muffin}) = \frac{\text{Number of pumpkin spice muffins sold}}{\text{Total number of muffins sold}} $$ $$ P(\text{pumpkin spice muffin}) = \frac{3}{18} $$

Step4: Simplify the fraction.

Divide both the numerator and the denominator by their greatest common divisor, which is 3. $$ \frac{3 \div 3}{18 \div 3} = \frac{1}{6} $$

Answer:

$$ \frac{1}{6} $$