The number of rational points on the line joining `(sqrt(5), 3)` and `(3, sqrt(3))` is

The inclination of the line joining the points (3-sqrt(3)) and (sqrt(3),-1) is -

Consider the line passing through (sqrt 3,1) and (1,sqrt3) Then number of rational points lying on the line is (i) 1 (ii) atleast 2 (iii) infty (iv) none of these

Consider the line passing through (sqrt 3,1) and (1,sqrt3) Then number of rational points lying on the line is (i) 1 (ii) atleast 2 (iii) infty (iv) none of these

The slope of the straight line joining the points (sqrt(3),1)and(-3,-sqrt(3)) is -

The number of rational terms in (sqrt(2)+ 3sqrt(3)+sqrt(5))^10 is (A) 2 (B) 3 (C) 4 (D) none of these

Find the angle which the line joining the points (1, sqrt3) and (sqrt2, sqrt6) makes with the x-axis.

Rationalize the denominatior of : (3)/(sqrt(5))

If P and Q are two points on the line joining A(-2,5),B(3,1) such that AP=PQ=QB then PB= sqrt(41) (2sqrt(41))/(3) (sqrt(41))/(3) (4sqrt(41))/(3)

Rationalize the denominator: 3/(2sqrt(5)-3sqrt(2))

Rationalize the denominator: 3/(2sqrt(5)-3sqrt(2))