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Re: Right triangle PQR is to be constructed in the xy-plane so t [#permalink]
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Carcass wrote:
Right triangle PQR is to be constructed in the xy-plane so that the right angle is at P and PR is parallel to the x-axis. The x- and y-coordinates of P, Q, and R are to be integers that satisfy the inequalities -4 ≤ x ≤ 5 and 6 ≤ y ≤ 16. How many different triangles with these properties could be constructed?

(A) 110
(B) 1,100
(C) 9,900
(D) 10,000
(E) 12,100


TOUGH!!

Take the task of building triangles and break it into stages.

Stage 1: Select any point where the right angle will be (point P).
The point can be selected from a 10x11 grid. So, there 110 points to choose from.
This means that stage 1 can be completed in 110 ways.

Stage 2: Select a point that is on the same horizontal line as the first point. This point will be point R.
The 2 legs of the right triangle are parallel to the x- and y-axes.
The first point we select (in stage 1) dictates the y-coordinate of point R.
In how many ways can we select the x-coordinate of point R?
Well, we can choose any of the 10 coordinates from -4 to 5 inclusive EXCEPT for the x-coordinate we chose for point P (in stage 1).
So, there are 9 coordinates to choose from.
This means that stage 2 can be completed in 9 ways.

Stage 3: Select a point that is on the same vertical line as the first point. This point will be point Q.
The 2 legs of the right triangle are parallel to the x- and y-axes.
The first point we select (in stage 1) dictates the x-coordinate of point Q.
In how many ways can we select the y-coordinate of point Q?
Well, we can choose any of the 11 coordinates from 6 to 16 inclusive EXCEPT for the y-coordinate we chose for point P (in stage 1).
So, there are 10 coordinates to choose from.
This means that stage 3 can be completed in 10 ways.

So, by the Fundamental Counting Principle (FCP), the total number of triangles = (110)(9)(10) = 9900

Answer: C

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Re: Right triangle PQR is to be constructed in the xy-plane so t [#permalink]
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x-axis: P and Q will always have same x coordinate so lets not consider Q in this scenario

P : can have values from -4 to 5. So, P can be placed in any one of the 10 coordinates
R : can also have values from -4 to 5 but P has already taken a point and R cannot take the same position because then it wont be a triangle.
So R can be placed in one of the 9 coordinates.

So in x-axis alone you can have 10*9 bases(PR) of the triangle.

y-axis : P and R will always have same x coordinate so lets not consider R in this scenario

P : can have values from 6 to 16. So, P can be placed in any one of the 11 coordinates
Q : can also have values from 6 to 16 but P has already taken a point and Q cannot take the same position because then it wont be a triangle anymore.
So Q can be placed in one of the 10 coordinates.

So in y-axis alone you can have 11*10 bases(PQ) of the triangle.

Thus total triangle you can have is 9*10*11*10 = 9900.
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Re: Right triangle PQR is to be constructed in the xy-plane so t [#permalink]
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To approach this, we have to find ways to select each of the coordinates (x,y) of Points P, Q, and R.

Such as P, Q, and R follow the x and y constraints

Anyways, first let's find out the total possible points we can select for both x, and y

for x, we have 10 possible points
for y, we have 11 possible points

Now, Let's check the number of ways Q can take values.

X coordinate of Q = 10C1 ways
Y coordinate of Q = 11C1 ways

Q is now dealt with

For P, the x coordinate is now fixed (as PQR is a right angle triangle and QP is perpendicular to PR, which is parallel to the X axis) because QP is parallel to the y-axis

but we still need to decide a y coordinate -

Therefore,
Y coordinate of P = 10C1 ways (One point is occupied by Q)

Now for R. We know, its y coordinate is fixed as PR is parallel to X axis

Therefore, for its Y coordinate =
Y coordinate of R = 9C1 ways (one point is occupied by P)


Therefore, total combinations =
[(X coordinate of Q = 10C1 ways) * (Y coordinate of Q = 11C1 ways)] * [Y coordinate of P = 10C1 ways] * [Y coordinate of R]
= 10*11*10*9
= 9,900

Thank You

Sincerely
Daksh Kumar
Prep Club for GRE Bot
Re: Right triangle PQR is to be constructed in the xy-plane so t [#permalink]
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