In this article, we will look at different types of vectors like zero, unit, coinitial, collinear, equal and negative vectors. Further, we will solve some examples to get a better understanding.

In the given figure , the common tangents AB and CD to two circles with centres O and O' intersect at E . Prove that the point O , E and O' are collinear .

Click here:point_up_2:to get an answer to your question :writing_hand:show that the points are collinear 5 1 5 5 10 7

Click here👆to get an answer to your question ️ using vector method prove that the following points are collinear

Using the vector equation of the straight line passing through two points, prove that the points whose vectors are a,b and (3a−2b) are collinear.

Let a, b and c be three non - zero vectors which are pairwise non- collinear. If a + 3b is collinear with c and b + 2c is collinear with a, then a + 3b + 6c is equal to

Click here👆to get an answer to your question ️ show by section formula that the points 32 52 and 88 are collinear

Find the value of λ so that the points (1, −5), (−4, 5) and λ, 7 are collinear. View Solution Q 5

Find the value of x for which the points A x, 2, B - 3, - 4 and C 7, - 5 are collinear. [CBSE 2015]

Using determinants, find the value of k so that the points (k, 2 − 2 k), (−k + 1, 2k) and (−4 − k, 6 − 2k) may be collinear.