SOLUTION: i have 4 question and i need solutiions too please 1)x^2-1=0 2)x^2-7=0 3)3x^2-12=0 4)5x^2-15=0

Algebra.Com
Question 408083: i have 4 question and i need solutiions too please
1)x^2-1=0

2)x^2-7=0

3)3x^2-12=0

4)5x^2-15=0
Answer by MathLover1(20849)   (Show Source): You can put this solution on YOUR website!
1)


=+-



2)


=+-



3)


=+-



4)







=+-




I will add here your questions from 16-25....

16.
16)x^2+2x-3=0.

Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=1, b=2, and c=-3




Square 2 to get 4




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 1 to get 2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




17)x^2-5x+6=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=1, b=-5, and c=6




Negate -5 to get 5




Square -5 to get 25 (note: remember when you square -5, you must square the negative as well. This is because .)




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 1 to get 2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




18)x^2-7x-8=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=1, b=-7, and c=-8




Negate -7 to get 7




Square -7 to get 49 (note: remember when you square -7, you must square the negative as well. This is because .)




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 1 to get 2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




19)x^2+x-20=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=1, b=1, and c=-20




Square 1 to get 1




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 1 to get 2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or



20)6-x-x^2=0..reorder
-x^2 -x +6 =0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=-1, b=-1, and c=6




Negate -1 to get 1




Square -1 to get 1 (note: remember when you square -1, you must square the negative as well. This is because .)




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and -1 to get -2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




21)4+5x+x^2=0
x^2+5x+4=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=1, b=5, and c=4




Square 5 to get 25




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 1 to get 2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




22)24+2x-x^2=0
-x^2 +2x + 24=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=-1, b=2, and c=24




Square 2 to get 4




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and -1 to get -2


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or




23)8x^2-1=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve (note: since the polynomial does not have an "x" term, the 2nd coefficient is zero. In other words, b=0. So that means the polynomial really looks like notice , , and )





Plug in a=8, b=0, and c=-1




Square 0 to get 0




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 8 to get 16


So now the expression breaks down into two parts


or



Now break up the fraction



or



Simplify



or



So the solutions are:

or





24)6x^2+5x+1=0

Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=6, b=5, and c=1




Square 5 to get 25




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 6 to get 12


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




25)3x^2-5x-28=0
Solved by pluggable solver: Quadratic Formula
Let's use the quadratic formula to solve for x:


Starting with the general quadratic





the general solution using the quadratic equation is:







So lets solve ( notice , , and )





Plug in a=3, b=-5, and c=-28




Negate -5 to get 5




Square -5 to get 25 (note: remember when you square -5, you must square the negative as well. This is because .)




Multiply to get




Combine like terms in the radicand (everything under the square root)




Simplify the square root (note: If you need help with simplifying the square root, check out this solver)




Multiply 2 and 3 to get 6


So now the expression breaks down into two parts


or


Lets look at the first part:





Add the terms in the numerator

Divide


So one answer is






Now lets look at the second part:





Subtract the terms in the numerator

Divide


So another answer is




So our solutions are:

or







RELATED QUESTIONS

hi i need help with quadratic equations and i need steps please 1)(x-6)(x-4)=0... (answered by MathLover1)
Please help I need to know do these Quadriac Equations have a solution or not. And how to (answered by stanbon)
I have these six problems that I need to work and can't remember what to do. 1. x^2-4=0 (answered by )
I have these six problems that I need to work and can't remember what to do. 1. x^2-4=0 (answered by drglass,AnlytcPhil)
Part of the graph to a curve has equation y=x³-15/2x²+12x-18. (a) Find the coordinates (answered by solver91311)
what is the linear equation of -3x+2=0 0=5x+3 0=-2x+4 -x+1+0 i really need help with... (answered by edjones)
Hello my name is Juan I'm in college, but I have a big problem I have 3 questions... (answered by Alan3354,addingup)
1/3x^3-x^2-3x+4 = 0 Please i need to find X values, thank... (answered by Fombitz)
1.(x+7)(x+1)=0 2.(x+2)(x+3)=0 3.x(x-2)=0 4.x(x-7)=0... (answered by MathLover1)