$$\\\sqrt3(1+\sqrt{2})*\sqrt{6}(3-2*\sqrt{2})\\\\ =\sqrt{3*6}*[(1+\sqrt{2})(3-2\sqrt{2})]\\\\ =\sqrt{2*9}*[1(3-2\sqrt{2})+\sqrt{2}(3-2\sqrt{2})]\\\\ =3\sqrt{2}*[3-2\sqrt{2}+3\sqrt{2}-2\sqrt{2}\sqrt{2}]\\\\ =3\sqrt{2}*[3+\sqrt{2}-2*2]\\\\ =3\sqrt{2}*[\sqrt{2}-1]\\\\ =6-3\sqrt{2}$$
You need to check this answer :)
You remember the prefixes:
Milli means 1000 times smaller
centi means 100 times smaller
Kilo means 1000 times bigger.
They are the main ones :)
Yes, Dragonlance it makes my head hurt too.
My circle is not 2 parallel lines. You circle is in another universe.
It is 2:40 am and this is all too much at this time of night
Concetnric cirlcles and squares.
The pattern could go one for ever - the result would be a plane
Interesting thinking Dragonlance but I think that would make it a plane
It would be identical to a square of infinite side length :))
http://web2.0calc.com/questions/sugar-profit
Didn't CPhill answer this question for you yesterday Kiran?
Where are the statements?
Are there any perfect circles or are circles just infinite angles getting smaller each time.
Mmm,
I think circles are pretty perfect but I really do not know what you mean
"Infinite angles getting smaller each time" this is an interesting idea but I am having trouble seeing how it relates to a circle.
[Half] 1/2 (850) divide by 1650 x 100,
be the same as
425 divide by 1650 x 100?
$$\\\frac{1}{2}*850\div 1650*100\\\\ =\frac{850}{2}\div 1650*100\\\\ =425\div 1650*100\\\\ $so yes they are the same$\\\\ =\frac{425}{1650}*100\\\\ =\frac{425}{165}*10\\\\ =\frac{425}{33}*2\\\\ =\frac{850}{33}\\\\$$