# How Many Lines Are Determined By Three Distinct Points

How Many Lines Are Determined By Three Distinct Points. Web answer (1 of 2): So, we can name the lines as ab, bc and ac. Web there are 4 distinct points in a plane, the number of lines which can be made from these points = 4c2 = 4!/ (2! Terms in this set (4) way 1. A line needs two points to be drawn. So, option (b) is correct. Web and also outside of the plane is points a, and c.

Our expert is working on this class ix maths answer. Web see answer (1) best answer. Web since we know that three distinct points can either be collinear or noncollinear 3collinear points can form one line in the above figure we see that only one line can. So, a line can be. So, option (b) is correct. Web estimate the number of possible lines: This is a combination problem:

## Web 1) a,b and c are collinear points.

Web and also outside of the plane is points a, and c. If the three points are collinear then only one line can be drawn using these three points. Suppose the points p,q and. Web for example, the first two questions were how many lines can be drawn through 3 points? which is 3, and how many lines can be drawn through 4 points? which is 6. Terms in this set (4) way 1. • for,the first possibility,only one straight line can intersect all the three points. Web how many lines is 3 distinct points? Any 2 points determine a line.

### Let’s Take An Example Of 3 Distinct Points A, B, And C.

Web for example, the first two questions were how many lines can be drawn through 3 points? which is 3, and how many lines can be drawn through 4 points? which is 6. What factors determine a plane? So, only one line is determined by the points p, q and r. Do 3 points always sometimes or never determine a plane? If you think about it, determining a line requires two points. Hence, we get that only three lines are possible with the help of three distinct points. Web see answer (1) best answer.

## To Draw A Line We Required At Least Two Points.

Web how many lines is 3 distinct points? 4c2= 4!/2!2!=6 lines if there are 4 points and the lines can’t be composed of 3 collinear points (meaning that 3 points can’t lie in. 2!) = 4*3/ (2) = 6. Web answer (1 of 2): So, option (b) is correct. On a sphere two points can define infinitely many. Web answer (1 of 5):

## Conclusion of How Many Lines Are Determined By Three Distinct Points.

Web there are 4 distinct points in a plane, the number of lines which can be made from these points = 4c2 = 4!/ (2! So, only one line is determined by the points p, q and r.. No 3 are collinear, which means no two pairs define the. Web thus there are three lines determined by these three points.

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