Problem: In triangle ABC, side a=3β, side b=3β, and side c>3. Let x be the largest number such that the magnitude, in degrees, of the angle opposite side c exceeds x. Then x equals:
Answer Choices:
A. 150
B. 120
C. 105
D. 90
E. 60
Solution:
Consider the triangle ABC where a=3β,b=3β, and c=3, and CD is the altitude to AB.β΄BD=121β and AD=121β. Then CD2=3β(23β)2=43β, and CD=23ββ,β΄β B=β A=30β and β C=120β. Since side c is given greater than 3,β C exceeds 120β. (If two triangles have two sides of one equal to two sides of the other, and the third side of the first is greater than the third side of the second, the included angle of the first is greater than the included angle of the second.) c2=a2+b2β2abcosC,cosC=2aba2+b2βc2β=23β3β3+3βc2β where c2>9.β΄cosC<β21β, so that β C>120β.
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