1. The values of p and q are: p=31 and q= 4
2. B(11, 29/5)
Further explanation:
<u>1. L(15. 1) is the midpoint of the straight line joining point (p. - 2) to point D(-1. q) find p and q.</u>
Given:
M = (15. 1)
(x1, y1) = (p, -2)
(x2, y2) = (-1, q)
The formula for mid-point is:
Hence,
p=31
q=4
<u>2. M is the midpoint of the straight line joining point A (3. 1/5) to point B.If m has coordinates (7. 3), find the coordinates of B.</u>
Here,
(x1,y1) = (3, 1/5)
(x2, y2) = ?
M(x,y) = (7,3)
Putting values in the formula of mid-point
So, the coordinates of point B are (11, 29/5) .
Keywords: Finding mid-point, Finding coordinates through mid-point
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Answer:
<h2>1.102.08</h2>
Step-by-step explanation:
<h2>Numbers </h2><h2>A=1/2h(a+b)</h2><h3> =(9.6+15.92)8÷2</h3><h3> =25.52×4 =102.08</h3>
Answer:
a. n=8
Step-by-step explanation:
to solve an equation, we must do the same operations to both sides.
step 1- add 8 to both sides. now n/4-8=-6 becomes n/4=2
step 2- multiply both sides by 4. so n/4=2 becomes n=8, which gives us our answer.