The siope of the line `L` can be `(10+5sqrt6)/(10)`

In a triangle, the lengths of the two larger sides are 10 and 9, respectively. If the angles are in A.P, then the length of the third side can be (a) 5-sqrt(6) (b) 3sqrt(3) (c) 5 (d) 5+sqrt(6)

In a triangle, the lengths of the two larger sides are 10 and 9, respectively. If the angles are in A.P., then the length of the third side can be (a) 5-sqrt(6) (b) 3sqrt(3) (c) 5 (d) 5+sqrt(6)

In a triangle, the lengths of the two larger sides are 10 and 9, respectively. If the angles are in A.P., then the length of the third side can be (a) 5-sqrt(6) (b) 3sqrt(3) (c) 5 (d) 5+sqrt(6)

In a triangle, the lengths of the two larger sides are 10 and 9, respectively. If the angles are in A.P, then the length of the third side can be (a) 5-sqrt(6) (b) 3sqrt(3) (c) 5 (d) 5+sqrt(6)

In a triangle the lengths of the two larger are 10 and 9 respectively.If the angles are in A.P., the , length of the third side can be (A) 5-sqrt(6) (B) 3sqrt(3) (C) 5 (D) 5+sqrt(6)

In a triangle, the lengths of the two larger sides are 10 and 9, respectively. If the angles are in A.P., then the length of the third side can be 5-sqrt(6) (b) 3sqrt(3) (c) 5 (d) 5+sqrt(6)

If the distance from the origin to the line ax+by+5=0 is 5/(sqrt(10)) , then the distance from the origin to the line ax+by+10=0 is

The parametric equations of the line are give by x=-2+r/(sqrt(10)) and y=1+(3r)/(sqrt(10)) then for the line

(4-sqrt5)/sqrt10

Given P = (3,-6,10)and PQ = sqrt(17) . If direction cosines of line PQ are (-2)/(sqrt(17)),3/(sqrt(17)),(-2)/(sqrt(17)) , then point Q can be