Question

Math Help
A two-sided coin (heads/tails) is flipped once, and one card is drawn from a standard 52 deck of playing cards. Calculate the probability of each given situation, and drag the correct answer to it.


Flipping a Heads AND drawing a Heart
Flipping a Heads OR drawing a Heart
Flipping a Heads
Drawing a Heart
NOT drawing a King
Flipping a Tails AND drawing a King
Flipping a Tails OR drawing a King
Drawing a King OR drawing a Heart
Flipping a Heads OR flipping a Tails
Drawing a King AND drawing a Heart
1
1/4
1/52
1/8
12/13
15/26
3/4
4/13
1/2
1/26

Answer 1

Would you like to know how to do this or are only concerned with the answer?

Answer 2

@1DEA i know how just checking my work like always ..

Answer 3

ahh ok, I wasn't sure because if I had to throughly explain to how to get all the answers...it would take a long time. Do you want me just to explain each one, or do you have a particular one you don't understand that well?

Answer 4

no i just hope my Answers are right lol just put =
too the ones lol

Answer 5

sure.

Answer 6

Flipping a Heads AND drawing a Heart = 1/8
Flipping a Heads OR drawing a Heart = 3/4
Flipping a Heads = 1/2
Drawing a Heart =1/4
NOT drawing a King = 12/13
Flipping a Tails AND drawing a King = 1/26
Flipping a Tails OR drawing a King = 15/26
Drawing a King OR drawing a Heart = 4/13
Flipping a Heads OR flipping a Tails = 1
Drawing a King AND drawing a Heart = 1/52

sorry for taking so long, mental math problems lol. I think that's correct let me know if you have any disagreements.

Answer 7

flipping tails and drawing a king =1/26 ?

Answer 8

i think its 1/52 switch those two i think

Answer 9

the probability of flipping a tail is 1/2, right?
and the probability of drawing a king is 1/13
since you want both you multiply the two
making 1/26.

Answer 10

oh snap that fooled me i hate this kind of stuff

Answer 11

yup probability is by far the hardest Math, even more than linear, discrete, or multivariate

Answer 12

thanks lol i got some more stuff too lol

Answer 13

if you want me to help sure it's not a problem.

Answer 14

This is the ratio of the number of ways the event can occur to the number of ways the event cannot occur.
This is the number of selected outcomes divided by the total number of possible outcomes. It is a number between 0 and 1, including 0 and 1.
This is an outline designed to demonstrate or explain the number of times a specified periodic phenomenon occurs within a specified interval.
The desired outcomes of a specified event.
The different possible results from a probability model.
This helps to visually display the outcomes of an experiment consisting of a series of activities (rolling dice multiple times, total pizza choices, etc.). The total number of outcomes corresponds to the total number of final branches in the diagram.
An outcome in a probability experiment.
Events in which the outcome of one event affects the outcome of the other event.
A diagram that uses circles or ovals to illustrate the relationship between sets.
The mathematical calculation that an event will happen.
The ratio of the number of times an event occurs to the total number of trials.
This is the probability that event B will occur given that event A has occurred.
The sum of the probabilities of each outcome multiplied by the outcome value.
For probability this rule states that (A ∪ B) = P(A) + P(B) - P(A ∩ B)
A complementary event is the event that doesn't happen. If the probability of an event occurring is A, the the probability of the complementary event is 1-A. The sum of the probability of an event and the complementary event is



Dependent Events Event Favorable Outcomes Frequency Diagram OddsOutcomes Probability Tree Diagram Venn Diagramaddition rulecomplementary eventsconditional probability expected value experimental probability theoretical probability

Answer 15

Dependent events
Event
Favorable outcomes
Frequency diagram
Odds
outcomes
Probability
Tree Diagram
Venn Diagram
Addition Rule
conditional probability
complementary events
Expected value
experimental probability
theoretical probability

Answer 16

had to put it in order its like matching

Answer 17

that's a huge wall of text lol...let me read it

Answer 18

Oh I see got it matching...

Answer 19

its at each period :)

Answer 20

so you want the same as before?

Answer 21

yea lol my bad

Answer 22

This is the ratio of the number of ways the event can occur to the number of ways the event cannot occur. - Odds

This is the number of selected outcomes divided by the total number of possible outcomes. It is a number between 0 and 1, including 0 and 1. - Theoretical Probability

This is an outline designed to demonstrate or explain the number of times a specified periodic phenomenon occurs within a specified interval. -Frequency diagram

The desired outcomes of a specified event. - Favorable outcomes

The different possible results from a probability model. -outcomes

This helps to visually display the outcomes of an experiment consisting of a series of activities (rolling dice multiple times, total pizza choices, etc.). The total number of outcomes corresponds to the total number of final branches in the diagram. - Tree Diagram

An outcome in a probability experiment. - Event

Events in which the outcome of one event affects the outcome of the other event. - Dependent events

A diagram that uses circles or ovals to illustrate the relationship between sets. - Venn Diagram

The mathematical calculation that an event will happen. - Probability

The ratio of the number of times an event occurs to the total number of trials. -
Experimental Probability

This is the probability that event B will occur given that event A has occurred. - conditional probability

The sum of the probabilities of each outcome multiplied by the outcome value. - Expected value

For probability this rule states that (A B) = P(A) + P(B) - P(A B) - (most likely the addition rule, can't really tell due to the question marks)

A complementary event is the event that doesn't happen. If the probability of an event occurring is A, the the probability of the complementary event is 1-A. The sum of the probability of an event and the complementary event is - 1???? The remaining answer is complementary event but honestly it doesn't make much

Oh also I am uncertain about whether theoretical probability or probability should be switched

Answer 23

*make much sense.

Answer 24

thanks lol @1DEA