Working with Percents
The decimal form of a percent is called the multiplier for that percent. This is because we can simply multiply by this form to take a percent of the number. So, when we're using percents as multipliers, here are the basic things to remember. Remember that is means equals, remember that of means multiply, change any percent to the multiplier form, and replace unknowns with a variable.
So, for example, what is 80% of 200? The what, the unknown, that would be x, is, that becomes equal. 80%, that will become the multiplier, 0.8. And then we'll multiply that of times 200. So, translating that sentence into math, we get 0.8 times 200, we multiply out, we get 160.
Similarly 240 is 30% of what number? 240 equals 0.3, 30% is 0.3,times and then what number, x. So, translating to math, and of course we divide, move the decimal place over, and divide out, we get 800. Now, the second way to use this is in questions where we have to find the percent.
So, 56 is what percent of 800? So, here we set things up again 56 equals x times 800, you have to remember that, that x of course is a multiplier. So we divide out, we can cancel the factor 8, we get 7 over 100, which is 0.07. That's a multiplier, which corresponds to 7%. Finally percents and fractions.
Use this approach only if the percent is a very easy fraction, for example one-half or one-quarter. So, if it's a very easy fraction, then sometimes it's easier to change things to a fraction. So we get the question, what is 75% of 280? Well, it's much easier just to remember 75%.
That's three-quarters. What's three quarters of 280? Cancel the 4s we get 3 times 70, which is 210. Here's some practice problem, so pause the video and practice these now. Here are the answers. So in summary, use percent as multipliers.
That is their decimal form and the method for solving the simple percent problems. Using the same method to find an unknown percentage. So there, we. The unknown would be the percentage of itself. We'll get a decimal value, we'll have to remember that is the multiplier form, the decimal form of a percent and then we can use certain fraction shortcuts for percents
Solutions to the Practice Problems:
1) What is 60% of 60
Let's translate this into a simple equation.
What --> "x" or what we are trying to find.
is --> "="
60% --> 60/100 or .6
of --> " *"
x = .6 * 60
x = 36
So all we did was multiply 0.6*60 and we get 36 as our answer.
2) 52 is 40% of what number?
is --> "="
40% --. 40/100 or .4
of --> " * "
what number --> x
52 = .4 * x
We divide both sides by 0.4 and we get X = 52/0.4 = 130
Let's do a check and make sure we did everything right.
3) 18 is what percent of 45?
Before we do anything math let's do a ball park. We know that half of 45 is 22.5 So without doing any math/computation we know that 50% of 45 is 22.5 so 18 is going to be less than 50>#/p###
is --> " ="
what percent --> x/100
of --> "*"
18 = (x/100) * 45
18/45 = x/100
.4 = x/100
40 = x
So 18 is 40% of 45.
Notice we can simply divide 18 by 45 to get .4
.4 is 40% in decimal form.
4) What is 50% of 128? [64]
This one you're just dividing 128 by 2.
x = .5 * 128 or 128/2
128/2 = 64