5
answers
1
watching
204
views
31 Aug 2022
Answer in factored form (x-?)(x-?)
Can’t solve the x’s. What are the solutions
The example is in the other photo.
Use factoring to solve the equation
Rewrite the equation in a completely factored form.
____ = 0
(Factor completely.)
The solutions to the equation are x=
(Simplify your answer. Type an integer or a simplified fraction. Use a comma to separate answers as needed.)
The given equation is not written in a form with zero on one side.
To rewrite the equation with 0 on one side, subtract 60 from both sides.
Subtract
There is a greatest common factor (GCF) of 5 in the equation .
Remove the GCF from each term in the equation.
Now, factor the trinomial 4 x^2+13 x-12. To do this, use the factors of as the first terms of two binomials and factors of -12 as the last terms of the binomials. The factorization whose inner and outer products combine to .
So, the equation, , can be written in factored form as 5(x+4)(4 x-3)=0. Remember that, 5 0. So, to solve further, simplify (x+4)(4 x-3)=0.
Next, to solve further, use the zero product property. For real numbers a and b, if the product a b=0, then either a=0 or b=0.
Because 5 0, apply the zero product property to (x+4)(4 x-3)=0.
(x+4)(4 x-3)=0
x+4=0 or 4 x-3=0
x = -4 or x=-4, Solve the linear equations.
The solutions to
Answer in factored form (x-?)(x-?)
Can’t solve the x’s. What are the solutions
The example is in the other photo.
Use factoring to solve the equation
Rewrite the equation in a completely factored form.
____ = 0
(Factor completely.)
The solutions to the equation are x=
(Simplify your answer. Type an integer or a simplified fraction. Use a comma to separate answers as needed.)
The given equation is not written in a form with zero on one side.
To rewrite the equation with 0 on one side, subtract 60 from both sides.
Subtract
There is a greatest common factor (GCF) of 5 in the equation .
Remove the GCF from each term in the equation.
Now, factor the trinomial 4 x^2+13 x-12. To do this, use the factors of as the first terms of two binomials and factors of -12 as the last terms of the binomials. The factorization whose inner and outer products combine to .
So, the equation, , can be written in factored form as 5(x+4)(4 x-3)=0. Remember that, 5 0. So, to solve further, simplify (x+4)(4 x-3)=0.
Next, to solve further, use the zero product property. For real numbers a and b, if the product a b=0, then either a=0 or b=0.
Because 5 0, apply the zero product property to (x+4)(4 x-3)=0.
(x+4)(4 x-3)=0
x+4=0 or 4 x-3=0
x = -4 or x=-4, Solve the linear equations.
The solutions to
dcht24111997Lv10
15 Apr 2023
10 Sep 2022
Already have an account? Log in
Read by 1 person
Read by 2 people
31 Aug 2022
Already have an account? Log in
Read by 2 people
2806701601Lv2
31 Aug 2022
Already have an account? Log in