Statement-I If the vectors a and c are non collinear then the lines `r=6a-c+lambda(2c-a) and r=a-c+mu(a+3c)` are coplanar.
Statement-II There exist `lambda and mu` such that the two values of r in Statement-I becomes same.

If a,b and c are non-coplanar vectors, prove that 3a-7b-4c, 3a-2b+c and a+b+2c are coplanar.

a and b are non-collinear vectors. If c=(x-2) a+b and d=(2x+1)a-b are collinear vectors, then find the value of x.

If a, b and c are non-coplanar vectors and d=lambda vec a+mu vec b+nu vec c , then lambda is equal to

If a, b and c are non-collinear unit vectors also b, c are non-collinear and 2atimes(btimesc)=b+c , then

If a,b,c are three non-coplanar vectors, then 3a-7b-4c,3a-2b+c and a+b+lamdac will be coplanar, if lamda is

Show that the vectors a-2b+4c,-2a+3b-6c and -b+2c are coplanar vector, where a,b,c are non-coplanar vectors.

Consider the lines L_1 : r=a+lambdab and L_2 : r=b+mua , where a and b are non zero and non collinear vectors. Statement-I L_1 and L_2 are coplanar and the plane containing these lines passes through origin. Statement-II (a-b)cdot(atimesb)=0 and the plane containing L_1 and L_2 is [r a b]=0 which passe through origin.

If 10C_r=^10C_2 find the values of r.

If the points (0, 1, -2), (3, lambda, -1) and (mu, -3, -4) are collinear, verify whether the point (12, 9, 2) is also on the same line.

Statement I The equation |(x-2)+a|=4 can have four distinct real solutions for x if a belongs to the interval (-oo, 4) . Statemment II The number of point of intersection of the curve represent the solution of the equation. (a)Both Statement I and Statement II are correct and Statement II is the correct explanation of Statement I (b)Both Statement I and Statement II are correct but Statement II is not the correct explanation of Statement I (c)Statement I is correct but Statement II is incorrect (d)Statement II is correct but Statement I is incorrect