A ΔABC with sides a,b,c opposite to the angles A,B,C satisfies the inequality a2+b2+c2sin2A+sin2B+sin2C≤9.
Given a≥b≥c, and a attends its maximum possible value, then
A
Maximum area of the triangle is 94
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B
Maximum area of the triangle is 34
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C
Circumradius of the triangle is 3
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D
Inradius of the triangle when its area is maximum is 32(√2−1)
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Solution
The correct option is D Inradius of the triangle when its area is maximum is 32(√2−1) If R be the circumradius of ΔABC, then asinA=bsinB=csinC=2R
⇒a=2RsinA,b=2RsinB,c=2RsinC
a2+b2+c2sin2A+sin2B+sin2C≤9
⇒(2RsinA)2+(2RsinB)2+(2RsinC)2sin2A+sin2B+sin2C≤9
⇒(2R)2≤9 ⇒2R≤3
Now, a=2RsinA ⇒a≤3sinA ∴amax=3 at sinA=1 ⇒A=90∘⇒B+C=90∘
Area of ΔABC=12bcsinA=12(2RsinB)(2RsinC)=94(2sinBcosB)(∵B+C=90∘)=94sin2B
Area is maximum when sin2B=1 and maximum area =94 sin2B=1⇒B=45∘⇒C=45∘
Since, ΔABC is a right angled triangle, ∴ Circumradius, R=32