I'll take the American......looks like we're gonna' need a lot of cookies for that !!!
Geno....doesn't this come from the Indian mathematician, Ramanujan ???
I seem to remember [from Calculus class] that he showed that the same series could have different sums according to the arrangement of the series........
Only if you supply the milk, Melody ........!!!!!
√9160 = √[916 * 10] =√[458* 2 * 2 * 5] = √[229 * 2 * 2 *2 *5] = √[229 *4 *2 *5] = 2√[229*10]=
2√2290
5/6 - 1/4 get a common denominator of 24 .... so we have.....
(4/4)(5/6) - (6/6)(1/4) =
20/24 - 6/24 =
14/24 = 7/12
x/4+x/(x-4)=4/(x-4) subtract x/(x -4) from both sides
x/4 = 4/(x-4) - x / (x - 4)
x/4 = (4 - x) / (x -4) factor out a negative in the numerator on the right
x/4 = -(x - 4)/ (x -4) [note.... -a/a = -1]
x/4 = -1 multiply both sides by 4
x = -4
"n" = [ the number of terms in a row - 1 ] ... So, we are expanding (1 - 2x)^6
The 4th term is given by C(6,3)*(-2x)^3 = 20 * (-8x^3) = -160x^3
Do they look like this ???
Here's the answer : http://www2.ca.uky.edu/enri/pubs/enri129.pdf
[ Who says that you can't find the answer to every question on the internet ??? ]
2x^2 + 3xy – 4y^2 when x = 2 and y = - 4 ..... "plugging in," we have ......
2(2)^2 + 3(2)(-4) - 4(-4)^2 =
2*4 + (6)(-4) - 4(16) =
8 - 24 - 64 =
-16 - 64 =
-80
