BEFORE WE START:
• We are here to help you! Do NOT be afraid to ask questions.
• There are no dumb questions!
• The only dumb thing to do is not ask for help when you are stuck.
LAWS OF EXPONENTS• When dealing with exponents, there are
times we will have to operations such as adding, subtracting, dividing, and
multiplying exponents.
• We will learn these steps by using the methods of MADSPM (easy way to
remember it is by mad spam)
WHAT EXACTLY IS MADSPM??• Madspm is guide to help us understand and carry out opperations with
exponents correctly, and helps us understand what to do in math questions involving exponents.
MAWHEN WE
MULTIPLY LIKE VARIABLE
EXPONENTS
WE ADD THE EXPONENTS
DSWHEN WE DIVIDE LIKE VARIABLE
EXPONENTS
WE SUBTRACT EXPONENTS
PMWHEN WE HAVE
EXPONENTIAL VARIABLES
RAISDED TO A POWER
WE MULTIPLY THE EXPONENTS
MULTIPLYING • When we look at the MA part of MADSPM, we are dealing
with problems that involve multiplication of variables.
Lets look at an example of what to do when we multiply.
First we establish that we have 2 like variables. We continueby multiplying the coefficients, or the numbers, in front of the X variable.
Once we do that we come up with an answer of 21. Then weLook at the X variable and see that both X’s are raised to the 1Power. All we do with the X variables is add the exponent it is Raised to. In this case both are 1, so 1+1=2. The 2 is going to beOur new exponent of the X variable.
So what does our answer look like???
MULTIPLYING
• Lets look at another example.
We see we are going to multiply. What do we do??
1. Multiply the coefficients2. Add the exponents of the variables3. Get our result.
MULTIPLICATION EXERCISES
DIVIDING
• When we look at the DS part of MADSPM, we are dealing with problems that involve division of variables.
Lets look at an example of what to do when we divide.
First we establish that we have 2 like variables. We continueby dividing the coefficients, or the numbers, in front of the X variable.
Once we do that we come up with an answer of 1/2. Then welook at the X variable and see that one X variable is raised to the 4Power and that one is raised to the 3 power. All we do with the X variables Is subtract the exponents they are raised to. In all cases it will be the top minusthe bottom. So we are going to subtract 4-3=1
DIVIDING (CONTINUING)Our answer will look like this. The top coefficient will be 1 and sincewe are left with one X, it will stay on the top.
Note that the X will always go on the top if the exponent is positive! In this case the exponent was a positive one, so the X is raised to the power of 1.
Lets look at what happens when we have negative exponents
DIVIDING (CONTINUING)
We carry out the same process as the previous problem. Since 2/7 is already a simplified fraction, that stays the same. Now since we aredividing exponents we still subtract top minus the bottom. In this case2-5= -3.
We still write the X variable with a -3 exponent on the top but, since we cannot have a negative exponent on the top, we need to move it down. When we move down the negative exponentit changes to a positive exponent.
So what would our answer look like? The fraction cannot be simplified so it stays the same but since we bring down the negative exponent, it turns positive when you bring it down.
This is what our answer looks like
DIVISION EXAMPLES
POWERS RAISED TO POWERS
• When we look at the PM part of MADSPM, we are dealing with problems that involve powers being raised to other powers with variables.
Lets look at an example of what to do when we see powers raised to powers.
When we see this, all we do is multiply the EXPONENTS. In this case there is no coefficient so we do not distribute to a coefficient. If therewas a number in front of X we would need to distribute a 3 to that number as well as X.
All we do in this case is multiply 8 x 3 = 24. So what does our answer look like? Well this is what we are supposed to get.
• Lets look at an example when we have coefficients and a variable raised to a power.
POWERS RAISED TO POWERS
In this example, we are going to distribute a power of 6 to eachterm inside the parenthesis. So the 2 is going to be raised to a powerof 6 and the same rule of MADSPM applies to the X variable. We onlyMultiply the variable’s (letter) exponent by whatever it is being raised to.
So the 2 will be raised to a power of 6 to get Which equals
Then we multiply the X variable’s powers, 7 x 6 = 42. So our final answer looks like
1)
2)3)
POWER RAISED TO POWER EXERCISES
PRACTICE OF EVERYTHING COVERED TODAY
Multiply
Divide
Power Raisedto a Power