In triangle XYZ, side XY, which runs perpendicular to side YZ, measures 24 inches in length. If the longest side of the triangle is 26 inches, what is the area, in square inches, of triangle XYZ?
A. 100
B. 120
C. 140
D. 150
E. 165
The OA is B.
I'm confused by this PS question, is it a right triangle? Experts, any suggestion about how to solve it? Thanks in advance.
In triangle XYZ, side XY, which runs perpendicular to side..
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(1) yes the triangle is a right angle: "XY, which runs perpendicular to side YZ"LUANDATO wrote:In triangle XYZ, side XY, which runs perpendicular to side YZ, measures 24 inches in length. If the longest side of the triangle is 26 inches, what is the area, in square inches, of triangle XYZ?
A. 100
B. 120
C. 140
D. 150
E. 165
The OA is B.
I'm confused by this PS question, is it a right triangle? Experts, any suggestion about how to solve it? Thanks in advance.
(2) XZ, the hypotenuse, is 26 --> we know this as the longest side of the triangle is 26, if YZ was 26 then XZ would have to be greater than 26.
a^2 + b^2 = c^2
24^2 + YZ^ = 26^2
YZ^2 = 26^2 - 24^2
YZ^2 = (26-24)(26+4)
YZ^2 = (2)(50) = 100
YZ = 10
Area of the a triangle = (1/2)*base*height = (1/2)*(10)*(24) = 120. Answer is B.
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Hi LUANDATO,
We're told that in triangle XYZ, side XY, which runs PERPENDICULAR to side YZ, measures 24 inches in length and the longest side of the triangle is 26 inches. We're asked for the area, in square inches, of triangle XYZ.
To start, since two of the sides are PERPENDICULAR to one another, they form a right angle (thus, we're dealing with a right triangle). The GMAT has a number of 'Classic' right triangles that it may test you on (including the 45/45/90, 30/60/90, 3/4/5 and 5/12/13). Notice how 26 (the LONG side) is exactly DOUBLE 13 and 24 is exactly DOUBLE 12... this is a 5/12/13 that has been DOUBLED.
Thus, the two 'legs' of the triangle are 10 and 24 and the area of the triangle is...
A = (1/2)(Base)(Height) = (1/2)(24)(10) = (12)(10) = 120
Final Answer: B
GMAT assassins aren't born, they're made,
Rich
We're told that in triangle XYZ, side XY, which runs PERPENDICULAR to side YZ, measures 24 inches in length and the longest side of the triangle is 26 inches. We're asked for the area, in square inches, of triangle XYZ.
To start, since two of the sides are PERPENDICULAR to one another, they form a right angle (thus, we're dealing with a right triangle). The GMAT has a number of 'Classic' right triangles that it may test you on (including the 45/45/90, 30/60/90, 3/4/5 and 5/12/13). Notice how 26 (the LONG side) is exactly DOUBLE 13 and 24 is exactly DOUBLE 12... this is a 5/12/13 that has been DOUBLED.
Thus, the two 'legs' of the triangle are 10 and 24 and the area of the triangle is...
A = (1/2)(Base)(Height) = (1/2)(24)(10) = (12)(10) = 120
Final Answer: B
GMAT assassins aren't born, they're made,
Rich
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Since XY is perpendicular to YZ, the triangle is a right triangle, and hence we can use the Pythagorean theorem to determine side YZ:BTGmoderatorLU wrote:In triangle XYZ, side XY, which runs perpendicular to side YZ, measures 24 inches in length. If the longest side of the triangle is 26 inches, what is the area, in square inches, of triangle XYZ?
A. 100
B. 120
C. 140
D. 150
E. 165
(XY)^2 + (YZ)^2 = (XZ)^2
24^2 + s^2 = 26^2
576 + s^2 = 676
s^2 = 100
s = 10
Since the area of a right triangle is half the product of the two legs, we have:
Area of triangle XYZ = ½(24)(10) = 120
Answer: B
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