given that A={1,2,3,4,5,6,7,8,9,10}, B = {1,3,5,7,9} and R is a relation from A to B defined by R ={(a,b) : a€A, b€B and a is less...
one face of a cube has an area of 36 m^2. find it's volume
dy/dx when y=ln (x^2+2x/x^2-3x)
$\frac{8(10-x)}{(x+1)(x-10)}$ $\frac{x-8}{(x-8)(x+1)}$
dy/dx y=ln (x^2+2x/x^2-3x)
6sin^2(x)-7cos(x)-8=0
find the smallest positive multiple of 198 such that its digits are made up of only 1s and 2s
18a $^{2}$bc + 30ab$c^{2}$
6(sin^2)(x)-7cos(x)-8=0
8(10-x) over (x+1)(x-10) divided by x-8 over (x-8)(x+1)