All ACT Math Resources
Example Questions
Example Question #62 : Variables
Find the -intercepts:
only
and
and
and
and
-intercepts occur when .
1. Set the expression equal to and rearrange:
2. Factor the expression:
3. Solve for :
and...
4. Rewrite the answers as coordinates:
becomes and becomes .
Example Question #63 : Variables
Solve for when .
1. Factor the expression:
2. Solve for :
and...
Example Question #1 : Trinomials
Factor the following expression:
Remember that when you factor a trinomial in the form , you need to find factors of that add up to .
First, write down all the possible factors of .
Then add them to see which one gives you the value of
Thus, the factored form of the expression is
Example Question #4 : Trinomials
Factor the expression completely
First, find any common factors. In this case, there is a common factor:
Now, factor the trinomial.
To factor the trinomial, you will need to find factors of that add up to .
List out the factors of , then add them.
Thus,
Example Question #5 : Trinomials
Which expression is equivalent to the polynomial .
This question calls for us to factor the polynomial into two binomials. Since the first term is and the last term is a number without a variable, we know that how answer will be of the form where a and b are positive or negative numbers.
To find a and b we look at the second and third term. Since the second term is we know . (The x comes from a and b multiplying by x and then adding with each other). The +10 term tells us that . Using these two pieces of information we can look at possible values. The third term tells us that 1 & -10 and -1 & 10 are the possible pairs. Now we can look and see which one adds up to make 9. This gives us the pair -1 & 10 and we plug that into the equation as a and b to get our final answer.
Example Question #1 : How To Factor A Trinomial
Which expression is equivalent to the following polynomial:
This question calls for us to factor the polynomial into two binomials. Since the first term is and the last term is a number without a variable, we know that how answer will be of the form where a and b are positive or negative numbers.
To find a and b we look at the second and third term. Since the second term is we know . (The x comes from a and b multiplying by x and then adding with each other). The -14 term tells us that . Using these two pieces of information we can look at possible values. The third term tells us that 1 & -14, 2 & -7, -2 & 7, and -1 & 14 are the possible pairs. Now we can look and see which one adds up to make 5. This gives us the pair -2 & 7 and we plug that into the equation as a and b to get our final answer.
Example Question #7 : Trinomials
Which expression is equivalent to the following polynomial:
This question calls for us to factor the polynomial into two binomials. Since the first term is and the last term is a number without a variable, we know that how answer will be of the form where a and b are positive or negative numbers.
To find a and b we look at the second and third term. Since the second term is we know . (The x comes from a and b multiplying by x and then adding with each other). The term tells us that . Using these two pieces of information we can look at possible values. The third term tells us that 1 & 8, 2 & 4, -2 & -4, and -1 & -8 are the possible pairs. Now we can look and see which one adds up to make -9. This gives us the pair -1 & -8 and we plug that into the equation as a and b to get our final answer.
Example Question #1 : How To Multiply Trinomials
Simplify the following:
To multiply trinomials, simply foil out your factored terms by multiplying each term in one trinomial to each term in the other trinomial. I will show this below by spliting up the first trinomial into its 3 separate terms and multiplying each by the second trinomial.
Now we treat this as the addition of three monomials multiplied by a trinomial.
Now combine like terms and order by degree, largest to smallest.
Example Question #1 : How To Multiply Trinomials
Solve:
The is distributed and multiplied to each term , , and .
Example Question #2 : How To Multiply Trinomials
Which of the following is equal to ?
is multiplied to both and and is only multiplied to .
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