0
What is the equation and its distance from origin that meets the line joining the points 13 17 and 19 23 at its midpoint on the Cartesian plane showing work?
Wiki User
∙ 9y ago
Points: (13, 17) and (19, 23)
Midpoint: (16, 20)
Slope of required equation: 5/4
Its equation: 4y = 5x or as y = 1.25x
Its distance from (0, 0) to (16, 20) = 4 times sq rt 41
Wiki User
∙ 9y ago
Add your answer:
Earn +20 pts
How many midpoints does a line segment contain?
it depends on how long or how many joining segments it has. normally one line segment contains only one midpoint. Unless it has a joining segment there is only one midpoint.
How do you find the midpoint the slope the perpendicular slope and the equation for the perpendicular bisector of the line segment joining the points of 3 5 and 7 7?
Midpoint = (3+7)/2, (5+7)/2 = (5, 6) Slope of line segment = 7-5 divided by 7-3 = 2/4 = 1/2 Slope of the perpendicular = -2 Equation of the perpendicular bisector: y-y1 = m(x-x1) y-6 =-2(x-5) y = -2x+10+6 Equation of the perpendicular bisector is: y = -2x+16
What is the perpendicular bisector equation joining the line segment of -2 plus 5 and -8 -3 giving brief details?
Points: (-2, 5) and (-8, -3) Midpoint: (-5, 1) Slope: 4/3 Perpendicular slope: -3/4 Use: y-1 = -3/4(x--5) Bisector equation: y = -3/4x-11/4 or as 3x+4y+11 = 0
What is difference between Cartesian product and natural Join Operation?
Difference Between CARTESIAN PRODUCT & NATURAL JOINT Cartesian product is like the cross product ie every element of one row of one table/entity is multiplied to every column of another table for solving linked queries of two tables ... Where as natural Join is simply joining two or more entities eliminating the common attributes or columns.. @nayan answered it :)
How are ratios used in astronomy?
The parsec is a unit of distance equivalent to about 3.26 light years or 31 trillion kilometres. It is used to measure the distances to stars, with kilo and mega parsecs being used for objects further away. A parsec is based on the tangent ratio. The angle in question is that subtended at the distant object by the lines joining it to the earth and the sun, and the opposite side is the earth-sun distance - 1 astronomical unit (AU). The result is the distance of the object from the sun.
What is the equation of the straight line from the origin to the midpoint of the line joining 3 2 and 5 -1?
It will have no y intercept and it is: y = 0.125x
A triangle is a segment joining a vertex and the midpoint of the side opposite the vertex?
A triangle is not a segment joining a vertex and the midpoint of the side opposite the vertex.
What is the midpoint of the line joining the points (3, 2) and (1, 4)?
The midpoint is (2,3)
How many midpoints does a line segment contain?
it depends on how long or how many joining segments it has. normally one line segment contains only one midpoint. Unless it has a joining segment there is only one midpoint.
What is the length and midpoint of the line segment joining the points of -6 1 and 6 6?
Length = 13 units Midpoint = (0, 3.5)
What is the midpoint of the segment joining (12 2) and (-5 -7)?
It is (3.5, -2.5)
How do I find the midpoint of the line segment joining the points (-1,3) and (-9,8)?
85
How do you find the right bisector of a triangle?
For triangle ABC, find the midpoint of side BC. Then, find the slope of side BC and use its negative reciprocal (since the negative reciprocal slope is the slope of the right bisector joining side BC and the opposite vertex). Finally, substitute the midpoint and negative reciprocal slope into the y=mx+b equation to get "b", then write the equation. :)
What is the equation of the straight line extending from the origin to the midpoint of the line joining 3 2 and 5 -1?
1st find the midpoint -- (4, 1/2) Now slope -- 1/2 divided by 4 = 1/8 y-intercept = 0 (origin) y = (1/8)x <--- answer
What is the perpendicular bisector equation joining the points of s 2s and 3s 8s on the Cartesian plane showing work?
Points: (s, 2s) and (3s, 8s) Slope: (8s-2s)/(3s-s) = 6s/2s = 3 Perpendicular slope: -1/3 Midpoint: (s+3s)/2 and (2s+8s)/2 = (2s, 5s) Equation: y-5s = -1/3(x-2s) => 3y-15s = -1(x-2s) => 3y = -x+17x Perpendicular bisector equation in its general form: x+3y-17s = 0
A line segment whose endpoints are the vertex of the triangle and midpoint of the opposite?
In geometry, a median of a triangle is a line segment joining a vertex to the midpoint of the opposing side.
What are the values of a and b when y plus 4x equals 11 is the perpendicular bisector of the line joining a 2 to 6 b showing workings?
They must be equidistant from the point of bisection which is their midpoint and works out that a = -2 and b = 4 Sketching the equations on the Cartesian plane will also help you in determining their values
