NVAMediumJEE 2023Properties of Triangles

JEE Mathematics 2023 Question with Solution

If the line x=y=zx=y=z intersects the line xsinA+ysinB+zsinC18=0x\sin A+y\sin B+z\sin C-18=0 and xsin2A+ysin2B+zsin2C9=0,x\sin 2A+y\sin 2B+z\sin 2C-9=0, where A,B,CA,B,C are the angles of a triangle ABCABC, then 80(sinA2sinB2sinC2)80\left(\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}\right) is equal to

Answer

Correct answer:5

Step-by-step solution

Standard Method

Given: The line x=y=zx=y=z intersects both equations

xsinA+ysinB+zsinC18=0x\sin A+y\sin B+z\sin C-18=0

and

xsin2A+ysin2B+zsin2C9=0.x\sin 2A+y\sin 2B+z\sin 2C-9=0.

Find: The value of 80(sinA2sinB2sinC2)80\left(\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}\right).

Let x=y=z=tx=y=z=t. Then the intersection point must satisfy both equations.

From the first equation,

t(sinA+sinB+sinC)18=0t(\sin A+\sin B+\sin C)-18=0

so

t=18sinA+sinB+sinC.t=\frac{18}{\sin A+\sin B+\sin C}.

From the second equation,

t(sin2A+sin2B+sin2C)9=0t(\sin 2A+\sin 2B+\sin 2C)-9=0

so

t=9sin2A+sin2B+sin2C.t=\frac{9}{\sin 2A+\sin 2B+\sin 2C}.

Equating the two values of tt,

18sinA+sinB+sinC=9sin2A+sin2B+sin2C.\frac{18}{\sin A+\sin B+\sin C}=\frac{9}{\sin 2A+\sin 2B+\sin 2C}.

Hence,

2(sin2A+sin2B+sin2C)=sinA+sinB+sinC.2(\sin 2A+\sin 2B+\sin 2C)=\sin A+\sin B+\sin C.

Using sin2A=2sinAcosA\sin 2A=2\sin A\cos A, we get

4(sinAcosA+sinBcosB+sinCcosC)=sinA+sinB+sinC.4(\sin A\cos A+\sin B\cos B+\sin C\cos C)=\sin A+\sin B+\sin C.

Now use the standard triangle identities

sinA+sinB+sinC=4cosA2cosB2cosC2\sin A+\sin B+\sin C=4\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2}

and

sin2A+sin2B+sin2C=4sinAsinBsinC.\sin 2A+\sin 2B+\sin 2C=4\sin A\sin B\sin C.

Then

24sinAsinBsinC=4cosA2cosB2cosC2.2\cdot 4\sin A\sin B\sin C=4\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2}.

So,

2sinAsinBsinC=cosA2cosB2cosC2.2\sin A\sin B\sin C=\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2}.

Using

sinA=2sinA2cosA2,sinB=2sinB2cosB2,sinC=2sinC2cosC2,\sin A=2\sin\frac{A}{2}\cos\frac{A}{2},\quad \sin B=2\sin\frac{B}{2}\cos\frac{B}{2},\quad \sin C=2\sin\frac{C}{2}\cos\frac{C}{2},

we obtain

28sinA2sinB2sinC2cosA2cosB2cosC2=cosA2cosB2cosC2.2\cdot 8\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2}=\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2}.

Cancelling the nonzero factor cosA2cosB2cosC2\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2},

16sinA2sinB2sinC2=1.16\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}=1.

Therefore,

sinA2sinB2sinC2=116.\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}=\frac{1}{16}.

Hence,

80(sinA2sinB2sinC2)=80×116=5.80\left(\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}\right)=80\times \frac{1}{16}=5.

Therefore, the required numerical value is 55.

The source solution reaches the same final value, although one intermediate identity there is incorrect; the final answer is still 55.

Common mistakes

  • Setting x=y=zx=y=z but forgetting to use a common parameter tt in both equations. This is wrong because the same intersection point must satisfy both equations simultaneously. Write x=y=z=tx=y=z=t first, then derive two expressions for the same tt and equate them.

  • Using the incorrect identity cosA+cosB+cosC=1+4sinA2sinB2sinC2\cos A+\cos B+\cos C=1+4\sin\frac{A}{2}\sin\frac{B}{2}\sin\frac{C}{2}. This is wrong because the correct triangle identity is cosA+cosB+cosC=1+4sinA2sinB2cosC2\cos A+\cos B+\cos C=1+4\sin\frac{A}{2}\sin\frac{B}{2}\cos\frac{C}{2} in a specific symmetric form only after using angle-sum constraints carefully. Instead, use the safer identities for sinA+sinB+sinC\sin A+\sin B+\sin C and sin2A+sin2B+sin2C\sin 2A+\sin 2B+\sin 2C.

  • Cancelling factors such as cosA2cosB2cosC2\cos\frac{A}{2}\cos\frac{B}{2}\cos\frac{C}{2} without checking whether they can be zero. In a triangle, 00

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