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siddharth11.sharma
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Cordinate goemetry

by siddharth11.sharma Wed Dec 05, 2012 12:17 pm

In the X-Y coordinate system, what is the slope of the line that goes through the origin and is equidistant from the two points P (1,11) and Q (7,7)?

A) 2
B) 2.25
C) 2.50
D) 2.75
E) 3
hiteshwd
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Re: Cordinate goemetry

by hiteshwd Thu Dec 06, 2012 7:14 am

Good question, it had me pondering over it for an hour. Ok, here is a GMAt friendly and time saving solution:

Given the line is equidistant from the two points (1,11) and (7,7), the mid point of these two points must lie on the line
i.e. (4,9) must lie on the line.

Now, we know two points i.e. (0,0) and (4,9) that the line passes through, we can calculate the slope as (9-0)/(4-0) = 2.25

Answer B
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Re: Cordinate goemetry

by siddharth11.sharma Fri Dec 07, 2012 5:31 pm

oh......thanx very much for the guidence!

it was really resourceful.
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Re: Cordinate goemetry

by siddharth11.sharma Fri Dec 07, 2012 7:19 pm

One more ques:

If p and q are nonzero numbers, and p is not equal to q, in which quadrant of the coordinate system does point (p,p-q) lie?
1) (p,q) lies in quadrant IV.
2) (q,-p) lies in quadrant III.
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Re: Cordinate goemetry

by hiteshwd Sat Dec 08, 2012 4:52 am

Sure

Given: p,q not equal to 0 and p not equal to q

1) (p,q) lies in quad IV, which means p is positive and q is negative
=> p-q = +ve
=> p, p-q should lie in quad I as both are positive

SUFFICIENT

2) (q,-p) lies in quad III
=> p = +ve and q = -ve
which takes us onto the same process as in 1)

SUFFICIENT

Sol: D
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Re: Cordinate goemetry

by siddharth11.sharma Sat Dec 08, 2012 7:28 pm

thanx again:

In the xy-coordinate system, rectangle ABCD is inscribed within a circle having the equation x^2+y^2=25. Line segment AC is a diagonal of the rectangle and lies on the x-axis. Vertex B lies in quadrant II and vertex D lies in quadrant IV. If side BC lies on line y=3x+15. what is the area of rectangle ABCD?
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Re: Cordinate goemetry

by hiteshwd Mon Dec 10, 2012 11:34 am

Given:
a line equation & circle's equation, radius of circle = 5 and position of 4 points of rectangle

Solution: Soving the two equations we can get two points B & C where the line and circle intersect i.e. (-5,0) and (-4,3)

We can now draw the figure and know that to calculate the area of rectangle, we need to calculate the area or one triangle and multiply by 2

Area of triangle ABC = 1/2 * B * H = 1/2 * 10 * 3 = 15
Hence, area of rectangle is 30
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Re: Cordinate goemetry

by jlucero Wed Dec 12, 2012 4:34 pm

3 for 3. Well explained hiteshwd.
Joe Lucero
Manhattan GMAT Instructor