It is known that if x + y = 10 then x + y + z = 10 + z. The Euclid’s axiom that illustrates this statement is :

It is known that x+y=10 and that x=z. show that z+y=10?

Factorise : z – 7 + 7 x y – x y z

The plane 2x - y + 4z = 5 , 5x - 2.5y + 10z = 6 are :

The planes 2x - y + 4z = 5 and 5x - 2.5y + 10z = 6 are :

The distance between the planes 3x + 2y - 6z - 18 = 0 and 3x + 2y - 6z + 10 = 0 is

Minimize z = 2x + 3y , such that 1 le x + 2y le 10, x ge 0, y ge 0 .

Statement I If tan^(-1) x + tan^(-1) y = pi/4 - tan^(-1) z " and " x + y + z = 1 , then arithmetic mean of odd powers of x, y, z is equal to 1/3 . Statement II For any x, y, z we have xyz - xy - yz - zx + x + y + z = 1 + ( x - 1) ( y - 1) ( z - 1)

Find lambda and mu so that the simultaneous equations x+y+z= 6, x + 2y + 3z = 10, x + 2y + lambda z = mu have infinite number of solutions.

Maximize z = 5x + 7y such that 2x + y ge 8, x + 2y ge 10 x, y ge 0 .