Try not asking a question that is alreay asked. To know if it's asked or not, just search the question on the web.
It's already asked, https://web2.0calc.com/questions/quadratic_67073.
Re- arange to
x^2 + 6x - 233 Again...Quadratic Formula results in x = -3 +- 11 sqrt 2
the smallest would be - 3- 11 sqrt 2
I don't understand. Is this a question or what?
The least possible value of |a_{n - 1}| is 26, given by the polynomial 2x^3 - 26x^2 + 38x + 66 = 2(x + 1)(x - 11)(x - 3).
Got it from https://web2.0calc.com/questions/polynomial-roots. It was already asked. LOL!!
First of all that's not an answer
Second of all, even the lyrics are wrong...
a-7 = n so a = n+7
b+7 = n so b = n-7
c/7 = n so c = 7n a + b + c = 60 sub in the values above
n+7 + n-7 + 7n = 60
9n = 60 n = 60/9 or = 6 2/3
The line 3y=x intersects the line 2x+5y at point A.
What is the sum of the coordinates of point A?
Hello Guest!
2x + 5y is not a function equation.
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What is the value of N?
\(a+b+c=60\\ N=a-7=b+7=\dfrac{c}{7}\\ b=a-14\\ c=7a-49\\ a+a-14+7a-49=60\\ 9a=60+49+14\)
\(a=13\frac{2}{3}\\ N=a-7=13\frac{2}{3}-7\)
\(N=6\frac{2}{3}\)
Its about hunger its about power we stay hungry we devour.
What is the domain of the real-valued function (2x - 7) sqrt(x^2 - 5x + 6)?
\(\qquad (2x - 7) \sqrt{x^2 - 5x + 6}\\ \qquad x^2-5x+6\ge0\\ \qquad (x-2)(x-3)\ge0\\ \qquad x\le2\qquad or \qquad x\ge 3\)
x ==7 and y==1
These are the only positive integers that balance the equation.
twenty
There are 425,420 ways.
There are 58,842 possible arrangements.
The area is 27.
g(x) = x^2 - 8x + 2.
Yes, the rotts of the equation ar x = -1 and x = -11
-11? Do you already know the answer to this answer?
HINT: (x+11) = 0 to find the other root
I'll try finding the other one too.
The only one for a that I found is 3.
No, you're the one missing a brain. Are you a zombie? LOL!
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