The answer is A because the diagram shows
Answer:
We have to find point that partition line segment AB with end points (-5,3) (-1,-5) in ratio 1:3
Assume (-5,3) as ( a,b)
Assume (-1,-5) as (c,d)
Assume ratio 1:3 as m:n
Step-by-step explanation:
Remember this formula
Partition point =( mc + na)/m+ n , ( md+ nb)/m+n
=[ (1)(-1)+ 3(-5)]/1+3, ( 1(-5) + 3(3))/1+3
= -1 -15)/4,( -5 + 9)/4
= -16/4, 4/4
= -4, 1
Answer:
Both are rational numbers
Both are Natural numbers
Both numbers are at the same distance of 1000
|1000-1003| = |997-1000|
Step-by-step explanation:
Both numbers have several things in common.
Both are rational numbers since they can be written as whole number fractions:
1003 = 1003/1
997 = 997/1
Both are Natural numbers, since they are non-negative integers.
Also both numbers are at the same distance of 1000.
| 997 -1000 | = 3
| 1000-1003 | = 3
For this, all you have to do is create equations where all you have to do is change the x value. The equation for gym A would be 35 + 42x, where x is the number of months he has the membership, and the first number is the initial fee. The equation for gym B would be 65 + 36x, following the same rules. Now all you have to do is set both of these equations equal to each other:
65+36x=35+42x
Solving this equation results in x=5, which means that he has to have the memberships for 5 months for them to be equal. Now just plug that in to one side of the equation to get the amount he has to spend:
65+36(5) = $245
The answer should be f(x) = 4(x+3) based on your description of slope.<span />
