All Algebra II Resources
Example Questions
Example Question #3492 : Algebra 1
The amount of money you earn is directly proportional to the nunber of hours you worked. On the first day, you earned $32 by working 4 hours. On the second day, how many hours do you need to work to earn $48.
The general formula for direct proportionality is
where is how much money you earned, is the proportionality constant, and is the number of hours worked.
Before we can figure out how many hours you need to work to earn $48, we need to find the value of . It is given that you earned $32 by working 4 hours. Plug these values into the formula
Solve for by dividing both sides by 4.
So . We can use this to find out the hours you need to work to earn $48. With , we have
Plug in $48.
Divide both sides by 8
So you will need to work 6 hours to earn $48.
Example Question #1851 : Algebra Ii
The quantity x varies directly with y. If x is 26 when y is 100, find x when y is 200.
6.5
52
104
26
13
52
We must set up a proportion. Since x varies directly with y, when y is multiplied by 2, x is also multiplied by 2. 26 times 2 is 52.
Direct variation:
Example Question #1852 : Algebra Ii
The number of pizzas is directly proportional to the number of people attending the party. If pizzas are needed for people, how many pizzas are needed for people?
Let be the number of pizzas and be the number of people attending. Because is directly proportional to , we have
and from the problem
.
Therefore, solving for we get:
Now solving for ,
Thus, for 18 people 9 pizzas are needed.
Example Question #12 : Other Mathematical Relationships
Resistance in a wire to the flow of electricity is calculated by where is the length of the wire, is the cross sectional area, and is the predefined resistivity of the material the wire is made of. Which variable (s) is/are directly proportional to the resistance of the wire?
Direct proportionality results when two quantities increase or decrease at the same time. In the formula for resistance, , as increases so too does . The same is true for . It helps to think of these variables in terms of numbers. When the numerator of this formula is increased and the denominator remains the same, the overall quotient would be larger. The opposite is true if the numerator is decreased and the denominator remains the same (quotient would be smaller).
Example Question #13 : Other Mathematical Relationships
Write the following equation:
k and x are directly proportionate to y.
Direct proportionality means that as one increases so does the other. The equation that is indicative of this statement is the following:
Example Question #1852 : Algebra Ii
The amount of money earned in a week while working in a snow shoveling business is directly proportional to the number of driveways that the workers shovel. If the business earned $3000 in a week while shoveling 600 driveways how much did they earn for shoveling each driveway?
Direct proportionality means you should use the equation
The question says that the amount of money earned by the business is directly proportional to the number of driveways shoveled so that means y must be the amount of money earned ($3000) and x must be the amount of driveways shoveled (600). Plugging these values into the equation you should get
Solve for k by doing the opposite of what is being done to k on both sides of the equation. Since k is being multiplied by 600 divide both sides by 600
Each driveway earned the snow shoveling business $5
Example Question #124 : Sat Subject Test In Math I
The force from gravity () is directly proportional to the inverse of the square of the distance () you are from an object. Which formula shows that?
Breaking down the question one small piece at a time:
"The force from gravity () is directly proportional" means that the gravity term is going to be on one side of the proportional symbol, and everything else is going to be on the other side.
"to the inverse...of the distance" means that the distance will be in the denominator. As distance gets larger, force will get smaller.
"of the square of the distance" means that the distance will be squared.
Putting it all together gives:
Example Question #14 : Direct Proportionality
Billy's distance is proportional to his travel time. If Billy walks 2 miles in five hours, how far would he have traveled if he walked for seven hours?
Write the direct proportionality relationship.
Assume represents the time, and the represents the distance traveled.
Substitute the given information to solve for the constant.
Divide by five on both sides.
The value of is:
Substitute this value back into the direct proportionality relationship.
Substitute seven into the and simplify.
The answer is:
Example Question #15 : Direct Proportionality
A car's distance traveled varies proportionally to the time it had traveled. If the car travels 75 miles in 2 hours, what is the distance it had traveled in hours?
Write the formula for direct proportionality.
The distance is dependent on the time that the car has traveled. The variables are directly proportional to each other.
Rewrite the equation in terms of distance and time:
Substitute the known distance and time.
Solve for k by dividing by two.
The equation is:
Substitute the time hours to determine the distance traveled.
The car will have traveled in hours.
Example Question #16 : Basic Single Variable Algebra
A man wants to find the height of a building. Being unable to climb the building to measure its height directly, he waits until it's a sunny day and stands so that the top of his shadow lines up with the top of the building's shadow. He know's that he's tall, and that he's from where the shadows stop. He them measures that he's from the edge of the building. What is the building's height?
First, let's make the height of the building . We're looking for a ratio of the height of the object to the length of its shadow. For the man, we know both of these things, so we can express the ratio:
We don't know the building's height, so let's just use as a stand-in for the ratio for now. Also, the length of the building's shadow is the length of the man's shadow plus the distance he is from the building:
We set these ratios equal to each other, and solve:
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