find the coordinates of the point on the directed segment from (3,2) to (6,8) that divides it into a ratio of 1:3.
2 answers:
Answer:
(3.75, 3.5)
Step-by-step explanation:
The weighting factors for the weighted average of the end points are the reverse of the length ratios.
For a 1 : 3 split, the first point is weighted by a factor of 3; the second point is weighted by a factor of 1. The weighted sum is divided by the total of the weights.
(3(3, 2) +1(6, 8))/(3+1) = (9+6, 6+8)/4 = (3.75, 3.5)
Answer:
Step-by-step explanation:
<em><u>Given:</u></em>
Point A(3, 2)
Point B(6, 8)
Point C lies on segment line AB and divides AB into a ratio of 1 : 3
<em><u>Solve for:</u></em>
Coordinate of C
<em><u>Solution:</u></em>
Denote the coordinate of origin O(0, 0)
Point A(3, 2) => Vector OA(3 - 0, 2 - 0) or OA(3, 2)
Point B(6, 8) => Vector OB(6 - 0, 8 - 0) or OB(6, 8)
=> Vector AB = Vector OB - Vector OA = (6 - 3, 8 - 2) or vector AB(3, 6)
Point C lies on segment line AB and divides AB into a ratio of 1 : 3
=> Vector AC = (1/3) Vector CB, or
AC/CB = 1/3
=> AC/(AC + CB) = 1/(1 + 3)
=> AC/AB = 1/4
=> AC = AB/4
=> Vector AC = (1/4) Vector AB = ((1/4)*3, (1/4)*6) = (0.75, 1.5)
=> Vector OC = Vector OA + Vector AC = (3 + 0.75, 2 + 1.5) = (3.75, 3.5)
=> C(3.75, 3.5)
Option d is correct!
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Answer:
Step-by-step explanation:
Since, By the given diagram,
The side of the inner square = Distance between the points (0,b) and (a-b,0)
Thus the area of the inner square = (side)²
Now, the side of the outer square = Distance between the points (0,0) and (a,0),
Thus, the area of the outer square = (side)²
Hence, the ratio of the area of the inner square to the area of the outer square
I hope this helps you
