You have ratios 3:4, 4:3, 2:5 and 5:2. Each of these ratios is such that in total gives 7.
Divide segment AB in seven equal parts. Then:
- Point P partitions the directed line segment from A to B into a 3:4 ratio. This means that point P lies three such parts to the right from point A and four such parts to the left from point B.
- Point Q partitions the directed line segment from A to B into a 4:3 ratio. This means that point Q lies four such parts to the right from point A and three such parts to the left from point B.
- Point R partitions the directed line segment from A to B into a 2:5 ratio. This means that point R lies two such parts to the right from point A and five such parts to the left from point B.
- Point S partitions the directed line segment from A to B into a 5:2 ratio. This means that point S lies five such parts to the right from point A and two such parts to the left from point B.
As you can see the closest point to point B is point S, because it lies 2 parts to the left from point B and and this amount of parts is the smallest one.
Answer: correct choice is point S.
Answer:
see attached diagram
Step-by-step explanation:
Given triangle has vertices at points B(-5,3), C(-5,7) and D(1,7). The center of dilation is point A(-1,3) and the factor of dilation is The dilation by a factor decreases lengths AB, AC and AD twice, then image triangle vertices are midpoints of segments AB, AC and AD.
1. The midpoint E of the segment AB has coordinates
2. The midpoint F of the segment AC has coordinates
3. The midpoint G of the segment AD has coordinates
The equation is given as W varies directly with u and inversely with d, then the equation is written as:
W = k1u
here k2 is the proportionality constant.
and p = k2
here k2 is the proportionality constant.
Thus, combining both equations we get, p = K
where K = K1*K2, is the proportionality constant.
Answer:
It will take 9 weeks
Step-by-step explanation:
56 + 8x 123
8x 67
x 8.375
<span>Solution k = {-1, -5}</span>