[Guest]

3x^2 - 6x + 4 = 0

Solver gets a cookie.

[Guest]

There is no solution for x

[Guest]

There is no solution for x

No possible solution whatsoever?

[Anon26]

1,1

I will PM you my address for the cookie if it is right,

I want a real cookie k?

[Guest]

1,1

I will PM you my address for the cookie if it is right,

I want a real cookie k?

[Guest]

1,1

I will PM you my address for the cookie if it is right,

I want a real cookie k?

I think the answers are 1,2. Steps?

[Guest]

I do not think there is any possible solution. x=1 is the equation miniumum, returning a value of 1, not 0. Any larger or smaller x will return a value larger than 1. A graph of this equation never touches zero for any x.

[Guest]

X = three plus or minus i times the square root of 3 all divided by 3

[Guest]

As stated above, the equation has no solution among the real numbers. If you Apply Baskhara, you get this:

x = (-b±√∆)/2a

or x = (6±√∆)/6

Where ∆ = b² - 4ac or ∆ = 6² -4.3.4 = 36 - 48 = -12

Since ∆ < 0, it's square root is not a real number. But if we let √(-12) = √(-1).√12, and √(-1)=i, where i is the imaginary unit, we get:

x = (6±√(-1).√12)/6

x = (6±i√12)/6

x = (6±i√(2²3))/6

x = (6±i2√3)/6

x = (3±i√3)/3

As stated in the previous post. So the 2 solutions are x₁=(3±i√3)/3 and x₂=(3±i√3)/3

[Guest]

C'mon kids! This is basic 9th grade algebra!

[Guest]

The answer lies within the set of complex numbers.

1+(3^1/2i)/3 or 1-(3^1/2i)/3

[Anon26]

oops

My answer above (1,1)

is the vertex of the graph,

[Guest]

Hints to solve for x:

Use quadratic formula

[-b +/- √(b^2-4ac)] / 2a a,b, and c come from ax^2+bx+c = 0

1, -1

[Guest]

Hints to solve for x:

Use quadratic formula

[-b +/- √(b^2-4ac)] / 2a a,b, and c come from ax^2+bx+c = 0

Right idea

1, -1

Answers are not right as neither satisfy the quadratic.

Edited June 11, 2011 by jpf

[Guest]

Close as I can get

-0.5275252316519470000

[Guest]

1+-(sqrt(3)/3)i where i equals the square root of -1

[Guest]

archlordbr came close, but then jpf got it first

[Guest]

Two of the possible ways are as such:

x = 1 ± ⅓∙i∙√3

x₁ = 1 - ⅓∙i∙√3

x₂ = 1 + ⅓∙i∙√3

archlordbr was the first to present a correct answer, though he did mistakenly keep the plus-minus sign ( ± ) for both roots when he meant plus ( + ) for one and minus ( - ) for the other. Nonetheless, the answer was still correct.

Will his cookie be chocolate chip?