Micheal incorrectly answered 6 out of 20 questions on his science test. What percent of the questions did micheal answer correctly?
To find the percentage of questions that Michael answered correctly, we first need to find the number of questions he answered correctly.
Michael answered 20 - 6 = <<20-6=14>>14 questions correctly.
To find the percentage, we divide the number of questions he answered correctly (14) by the total number of questions (20) and multiply by 100: 14/20 * 100% = 70%. Answer: \boxed{70}.
There are 15 ducks swimming in a pond. If 3/5 of the ducks are males, how many female ducks are swimming in the pond?
If 3/5 of the ducks are males, then 2/5 of the ducks are females.
We can find the number of female ducks by multiplying 2/5 by the total number of ducks.
2/5 * 15 = 6.
Therefore, there are 6 female ducks swimming in the pond. Answer: \boxed{6}.
karen has a bag of 5 pennies, 4 dimes, 7 quarters, and 4 nickles. What is the theoretical probability of her picking a dime out of the bag? Give me the answer in fraction, decimal, and percent form.
The total number of coins in Karen's bag is 5 + 4 + 7 + 4 = 20 coins.
The probability of picking a dime can be found by dividing the number of dimes (4) by the total number of coins (20).
In fraction form, the probability is 4/20.
In decimal form, the probability is 0.2.
To convert the decimal to a percent, we multiply by 100:
0.2 * 100% = 20%.
Therefore, the theoretical probability of Karen picking a dime is 4/20, 0.2, or 20%. Answer: \boxed{\frac{1}{5}}, 0.2, 20%.
drew has a deck of cards that contain 10 black cards and 4 red card. What is the theoretical probability of jay landing on a red space? Give me the answer in fraction, decimal, and percent form.
The total number of cards in Drew's deck is 10 + 4 = 14 cards.
The probability of landing on a red card can be found by dividing the number of red cards (4) by the total number of cards (14).
In fraction form, the probability is 4/14.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 2. Simplifying, we get 2/7.
In decimal form, the probability is approximately 0.2857.
To convert the decimal to a percent, we multiply by 100:
0.2857 * 100% = 28.57%.
Therefore, the theoretical probability of landing on a red card is 2/7, 0.2857, or approximately 28.57%. Answer: \boxed{\frac{2}{7}}, 0.2857, 28.57%.
jay has a spinner, with 5 equal sections: green, red, blue, and purple. What is the theoretical probability of jay landing on a red space? Give me the answer in fraction, decimal, and percent form.
Since there are 5 equal sections on the spinner, the probability of landing on a red space can be found by dividing the number of red sections (1) by the total number of sections (5).
In fraction form, the probability is 1/5.
In decimal form, the probability is 0.2.
To convert the decimal to a percent, we multiply by 100:
0.2 * 100% = 20%.
Therefore, the theoretical probability of Jay landing on a red space is 1/5, 0.2, or 20%. Answer: \boxed{\frac{1}{5}}, 0.2, 20%.
what is the theoretical probability of tim rolling a number greater then 4 on a standard number cube? Give me the answer in fraction, decimal, and percent form.
On a standard number cube, there are 6 possible outcomes: the numbers 1, 2, 3, 4, 5, and 6.
The number of outcomes that are greater than 4 is 2, which are the numbers 5 and 6.
The probability of rolling a number greater than 4 can be found by dividing the number of favorable outcomes (2) by the total number of possible outcomes (6).
In fraction form, the probability is 2/6.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 2. Simplifying, we get 1/3.
In decimal form, the probability is approximately 0.3333.
To convert the decimal to a percent, we multiply by 100:
0.3333 * 100% = 33.33%.
Therefore, the theoretical probability of Tim rolling a number greater than 4 on a standard number cube is 1/3, 0.3333, or approximately 33.33%. Answer: \boxed{\frac{1}{3}}, 0.3333, 33.33%.
what is the probability of Tammy NOT rolling an even number on a standard number cube? Give me the answer in fraction, decimal, and percent form.
On a standard number cube, there are 6 possible outcomes: the numbers 1, 2, 3, 4, 5, and 6.
The number of outcomes that are not even is 3, which are the numbers 1, 3, and 5.
The probability of Tammy not rolling an even number can be found by dividing the number of favorable outcomes (3) by the total number of possible outcomes (6).
In fraction form, the probability is 3/6.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 3. Simplifying, we get 1/2.
In decimal form, the probability is 0.5.
To convert the decimal to a percent, we multiply by 100:
0.5 * 100% = 50%.
Therefore, the probability of Tammy not rolling an even number on a standard number cube is 1/2, 0.5, or 50%. Answer: \boxed{\frac{1}{2}}, 0.5, 50%.
What is the probability of Tim rolling a number less then 3 on a standard number cube? Give me the answer in fraction, decimal, and percent form.
On a standard number cube, there are 6 possible outcomes: the numbers 1, 2, 3, 4, 5, and 6.
The number of outcomes that are less than 3 is 2, which are the numbers 1 and 2.
The probability of Tim rolling a number less than 3 can be found by dividing the number of favorable outcomes (2) by the total number of possible outcomes (6).
In fraction form, the probability is 2/6.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 2. Simplifying, we get 1/3.
In decimal form, the probability is approximately 0.3333.
To convert the decimal to a percent, we multiply by 100:
0.3333 * 100% = 33.33%.
Therefore, the probability of Tim rolling a number less than 3 on a standard number cube is 1/3, 0.3333, or approximately 33.33%. Answer: \boxed{\frac{1}{3}}, 0.3333, 33.33%.
Austin has a marble collection. He has 12 blue, 9 red. 16 black, and 8 orange marbles. If austin randomly chooses a marble what are his odds of drawing a red marble? Give me the answer in fraction, decimal, and percent form.
The total number of marbles in Austin's collection is 12 + 9 + 16 + 8 = 45 marbles.
The number of red marbles is 9.
The odds of drawing a red marble can be found by dividing the number of red marbles (9) by the total number of marbles (45).
In fraction form, the odds are 9/45.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 9. Simplifying, we get 1/5.
In decimal form, the odds are 0.2.
To convert the decimal to a percent, we multiply by 100:
0.2 * 100% = 20%.
Therefore, the odds of Austin drawing a red marble are 1/5, 0.2, or 20%. Answer: \boxed{\frac{1}{5}}, 0.2, 20%.
Bob is watching cars pass by. He counted 10 white, 7 blue, 3 red, and 5 black cars. What are the odds that the next car will NOT be white?
The total number of cars that Bob observed is 10 + 7 + 3 + 5 = 25 cars.
The number of cars that are not white is 7 + 3 + 5 = 15 cars.
The odds of the next car not being white can be found by dividing the number of cars that are not white (15) by the total number of cars (25).
In fraction form, the odds are 15/25.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 5. Simplifying, we get 3/5.
In decimal form, the odds are 0.6.
To convert the decimal to a percent, we multiply by 100:
0.6 * 100% = 60%.
Therefore, the odds of the next car not being white are 3/5, 0.6, or 60%. Answer: \boxed{\frac{3}{5}}, 0.6, 60%.
33 people are gathered at a baseball game. while talking, they realized 18 were rangers fans, Based off of the odds, what is the probability that the next person to walk up will be a rangers fan? Give me the answer in fraction, decimal, and percent form.
The total number of people gathered at the baseball game is 33.
The number of Rangers fans is 18.
To find the probability of the next person being a Rangers fan based on the odds, we need to divide the number of Rangers fans (18) by the total number of people (33).
In fraction form, the probability is 18/33.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 3. Simplifying, we get 6/11.
In decimal form, the probability is approximately 0.5455.
To convert the decimal to a percent, we multiply by 100:
0.5455 * 100% = 54.55%.
Therefore, based on the odds, the probability that the next person to walk up will be a Rangers fan is 6/11, 0.5455, or approximately 54.55%. Answer: \boxed{\frac{6}{11}}, 0.5455, 54.55%.
A spinner has 8 sections numbered 1 to 8. What is the probability of the spinner landing on a number greater than 7? Give me the answer in fraction, decimal, and percent form.
The spinner has 8 sections, numbered from 1 to 8.
The number of sections that are greater than 7 is 1, which is the number 8.
To find the probability of the spinner landing on a number greater than 7, we need to divide the number of favorable outcomes (1) by the total number of possible outcomes (8).
In fraction form, the probability is 1/8.
In decimal form, the probability is 0.125.
To convert the decimal to a percent, we multiply by 100:
0.125 * 100% = 12.5%.
Therefore, the probability of the spinner landing on a number greater than 7 is 1/8, 0.125, or 12.5%. Answer: \boxed{\frac{1}{8}}, 0.125, 12.5%.
A bag has 3 red, 5 blue, and 2 yellow pieces of candy. What is the probability of drawing a blue piece of candy? Give me the answer in fraction, decimal, and percent form.
The total number of pieces of candy in the bag is 3 + 5 + 2 = 10.
The number of blue pieces of candy is 5.
To find the probability of drawing a blue piece of candy, we need to divide the number of blue pieces (5) by the total number of pieces of candy (10).
In fraction form, the probability is 5/10.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 5. Simplifying, we get 1/2.
In decimal form, the probability is 0.5.
To convert the decimal to a percent, we multiply by 100:
0.5 * 100% = 50%.
Therefore, the probability of drawing a blue piece of candy is 1/2, 0.5, or 50%. Answer: \boxed{\frac{1}{2}}, 0.5, 50%.
a spinner consists of two A's three b's and three C"s. What is the probability of spinning a B? Give me the answer in fraction, decimal, and percent form.
The total number of options on the spinner is 2 + 3 + 3 = 8.
The number of B's on the spinner is 3.
To find the probability of spinning a B, we need to divide the number of B's (3) by the total number of options (8).
In fraction form, the probability is 3/8.
In decimal form, the probability is 0.375.
To convert the decimal to a percent, we multiply by 100:
0.375 * 100% = 37.5%.
Therefore, the probability of spinning a B is 3/8, 0.375, or 37.5%. Answer: \boxed{\frac{3}{8}}, 0.375, 37.5%.
The faces of a fair-sided cube are numbers 1 through 6. The number cube is rolled. What is the probability it will land on a 2? Give me the answer in fraction, decimal, and percent form.
The total number of possible outcomes on the number cube is 6 (since it has six faces).
The number of favorable outcomes (the cube landing on a 2) is 1.
To find the probability of the cube landing on a 2, we divide the number of favorable outcomes (1) by the total number of possible outcomes (6).
In fraction form, the probability is 1/6.
In decimal form, the probability is approximately 0.1667.
To convert the decimal to a percent, we multiply by 100:
0.1667 * 100% = 16.67%.
Therefore, the probability of the number cube landing on a 2 is 1/6, approximately 0.1667, or 16.67%. Answer: \boxed{\frac{1}{6}}, 0.1667, 16.67%.
Ben has a basket of 5 red balls, 3 yellow balls, and 2 green balls. What is the probability that the ball he randomly chooses will be red? Give me the answer in fraction, decimal, and percent form.
The total number of balls in the basket is 5 + 3 + 2 = 10.
The number of red balls is 5.
To find the probability of picking a red ball, we divide the number of red balls (5) by the total number of balls (10).
In fraction form, the probability is 5/10.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 5. Simplifying, we get 1/2.
In decimal form, the probability is 0.5.
To convert the decimal to a percent, we multiply by 100:
0.5 * 100% = 50%.
Therefore, the probability of randomly choosing a red ball is 1/2, 0.5, or 50%. Answer: \boxed{\frac{1}{2}}, 0.5, 50%.
You were given a deck of cards. If you drew one card, What is the probability of selecting queen?
In a standard deck of cards, there are 4 queens (one queen in each suit: hearts, diamonds, clubs, and spades) out of a total of 52 cards.
To find the probability of selecting a queen, we divide the number of favorable outcomes (4 queens) by the total number of possible outcomes (52 cards).
In fraction form, the probability is 4/52.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 4. Simplifying, we get 1/13.
In decimal form, the probability is approximately 0.0769.
To convert the decimal to a percent, we multiply by 100:
0.0769 * 100% = 7.69%.
Therefore, the probability of selecting a queen is 1/13, approximately 0.0769, or 7.69%. Answer: \boxed{\frac{1}{13}}, 0.0769, 7.69%.
The high school is raffling a new calculator. The school will be selling 500 tickets. if the crystal buy 50 tickets, what is the probability that she will win the calculator? Give me the answer in fraction, decimal, and percent form.
The total number of tickets being sold is 500.
The number of tickets that the Crystal buys is 50.
To find the probability of her winning the calculator, we divide the number of tickets she buys (50) by the total number of tickets being sold (500).
In fraction form, the probability is 50/500.
To simplify the fraction, we can divide both the numerator and denominator by their greatest common divisor, which is 50. Simplifying, we get 1/10.
In decimal form, the probability is 0.1.
To convert the decimal to a percent, we multiply by 100:
0.1 * 100% = 10%.