if it's possible to determine the length of a triangle with only the information of the inner degree...
eg. what is the length of the base AB when the two degrees CA and BC are 90 degrees and 35 degrees respectively?
(I did not choose the degrees 90 and 45 on purpose because that gives us the x-x-xsqrt2 lengths)
Thank you
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I was just wondering...
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Frankenstein
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Hi,
We can only find the ratio of side lengths when the internal angles of the triangle are given.
Even, in your case of 90,45,45 you can only get ratio but not the absolute values.
The ratio of sides of a triangle is same as the ratio of the sine(angle opposite to side).
We can only find the ratio of side lengths when the internal angles of the triangle are given.
Even, in your case of 90,45,45 you can only get ratio but not the absolute values.
The ratio of sides of a triangle is same as the ratio of the sine(angle opposite to side).
Cheers!
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EddieU
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Frankenstein wrote:Hi,
We can only find the ratio of side lengths when the internal angles of the triangle are given.
Even, in your case of 90,45,45 you can only get ratio but not the absolute values.
The ratio of sides of a triangle is same as the ratio of the sine(angle opposite to side).
Thanks for the quick reply,
could you please give me an example how to calculate the the ratios when you have the degrees 90, 35, 55
even with the triangle 90, 45, 45 I can't really see which one the opposite side is...there are always two opposite sides (opposite of 90degree are 45 and 45) I just know that 90 is double 45, so if 45 is x, 90 has to be 2x...but it would be nice to know how to get those ratios when the degrees differ from the standard 45-45-90 or 30-60-90 schema
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Frankenstein
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Hi,
If ABC is a triangle, BC is the opposite side of vertex A
AC is the opposite side of vertex B
AB is the opposite side of vertex C
Now, if the angles A,B,C are 90,45,45 respectively,
then BC:AC:AB = sine(angleA):sine(angleB):sine(angleC) = sine 90 : sin45: sine45
= 1:1/sqrt2:1/sqrt2 = sqrt2:1:1
Similarly for the case of 90,35,55, the ratio of sides will be sine 90 : sin35: sine55. For this we need to know the sine values of 35 and 55 degrees.
If ABC is a triangle, BC is the opposite side of vertex A
AC is the opposite side of vertex B
AB is the opposite side of vertex C
Now, if the angles A,B,C are 90,45,45 respectively,
then BC:AC:AB = sine(angleA):sine(angleB):sine(angleC) = sine 90 : sin45: sine45
= 1:1/sqrt2:1/sqrt2 = sqrt2:1:1
Similarly for the case of 90,35,55, the ratio of sides will be sine 90 : sin35: sine55. For this we need to know the sine values of 35 and 55 degrees.
Cheers!
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amit2k9
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with sin and cos 35 one can only get the ratio's of the sides not the actual measurements.
However, if one of the sides is known then it will help to determine the other sides.
However, if one of the sides is known then it will help to determine the other sides.
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Brent@GMATPrepNow
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In case there are students out there thinking, "Sines! I need to know about sines?!", I thought I should jump in and mention that you do not need to know about sines, cosines and tangents on the GMAT.
If you are asked to find the length of the side in a triangle, you will need to apply the Pythagorean theorem, or your knowledge similar triangles or "Special" triangles (45-45-90 or 30-60-90)
The above discussion, while mathematically correct, is beyond the scope of the GMAT.
Cheers,
Brent
If you are asked to find the length of the side in a triangle, you will need to apply the Pythagorean theorem, or your knowledge similar triangles or "Special" triangles (45-45-90 or 30-60-90)
The above discussion, while mathematically correct, is beyond the scope of the GMAT.
Cheers,
Brent
Brent Hanneson - Creator of GMATPrepNow.com
