Question 1023150: In the diagram below, BPCR is a rhombus, P is (0,6), C is (6,t) and B is (2,0). The Line PR and BC bisect at Q, PR = 2BC and PR =8sqrt 2
find
1, the value of t?
2, the co ordinates of R
3, the equation of PR
Answer by Edwin McCravy(20064)   (Show Source):
You can put this solution on YOUR website!
From just this information.
BPCR is a rhombus, P is (0,6), C is (6,t) and B is (2,0).
we know that C(6,t) is somewhere on the vertical line whose
equation is x=6 (the green line.
we know that since it is a rhombus, PC must equal
PC, so we can draw side BP, take a compass and swing an arc like
this red one with radius BP, and find only two possibilities
for point C, th points where the arc cuts the green line:
So the rhombus is one of these two:
 
Since we are told that PR = 2BC, we know it must be the second one,
not the first.
Since all the sides of a rhombus are equal in
length, we use the distance formula to find BP:
We use the distance formula again to set the
BP = PC = √40
Square both sides:
take square roots of both sides:
So t=4 or 8. Obviously the answer we
want is C(6,4),
So t=4
We can get the coordinates of R just by
counting units. We know that B is 6
units down and 2 units right from P.
So R must be 6 units down and 2 units
right from C. That would give us R(8,-2).
We could also get the coordinates of R
this way. We know that C is 6
units right and 2 units down from P.
So R must be 6 units right and 2 units
down from B. That would also give us
R(8,-2).
If we like can check to make sure that
PR = 2BC and PR =8sqrt 2
by using the distance formula, but
that's obvious if this is a legitimate
problem.
To find the equation of PR, the blue line below:
To find the equation of the PR, the blue line, we use
the slope formula to find the slope:
Slope formula:
m = 
where
P(x1,y1) = P(0,6)
and where R(x2,y2) = R(8,-2)
m = 
m = 
m = 1
Then we use the point-slope formula:
y - y1 = m(x - x1)
where (x1,y1) = (0,6)
y - 6 = 1(x - 0)
y - 6 = x
y = x + 6
Edwin
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