Q3. Let ABC be a triangle in the E.G.such that for somepositive real number R we have mR(ZBAC)=a,MR(ABC) = Band mR(ACB)=y.Letting AC

Answered: Q3. Let ABC be a triangle in the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

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Problem 1RQ

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Q3. Let ABC be a triangle in the E.G.such that for some
positive real number R we have mR(ZBAC)=a,MR(ABC) = B
and mR(ACB)=y.Letting AC <BC < AB, then we have:
D) a <B<y.
A) B<y<a
B) B<a <y C) y <B<a
Q4. In the model R³ of E.G., the following point is between
0(0,0,10) and P(3,6,10): A) (1,3,10) B) (0,0,10)
C) (1,2,10)
D) (1,0,10)

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Step 1

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We have a triangle $A B C$

$m_{R} (∠ B A C) = α m_{R} (∠ A B C) = β m_{R} (∠ A C B) = γ$

Now, we are given that $A C < B C < A B$

In a triangle, the angle opposite the largest side is largest, the angle opposite the second longest side is second largest and the angle opposite the smallest side is shortest.

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Q3. Let ABC be a triangle in the E.G.such that for some mR(ZBAC)=a,MR(ABC) = B positive real number R we have and mR(ACB)=y.Letting AC