23 Maths -- Trigonometry

The angles of a triangle are 105° and 15°. Find the ratio of its sides.

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If a4+b4+c4 = 2c2(a2+b2), prove that C = 45o or 135o.

a⁴ + b⁴ +c⁴= 2c²(a²+b²)

or, (a²+b²)²- 2a²b² + c⁴=2(a²+b²)c² [a²+ b²= (a+b)²- 2ab]

or, (a²+b²)²-2(a²+b²)c² + (c2)2=2a²b²

or, (a²+ b²-c2)2=2a²b²

or, a²+ b²-c2=2 ab

or, $\frac{a^{2}+ b^{2} - c^{2}}{ab}$ =2

or, $\frac{a^{2}+ b^{2} - c^{2}}{2ab}$ = $\frac{\sqrt{2}}{2}$

or, cos C = $\pm \frac{1}{\sqrt{2}}$

or, cos C = cos 45 or cos 135

or, C =45 or 135

The Sine LawStatement: In any triangle the sides are proportional to the Sine of the opposite angles.In other words, in any ΔABC,

Proof:
Let ABC be a triangle with a = BC, b = CA and c = AB, then three cases are possible. The angle C is either acute or right or obtuse angle.

Draw AD perpendicular to BC ( produce BC if necessary )
In ΔABC, SinB =for all figures

or, AD = cSinB (i)

Also inΔACD,
1{ SinC in fig (i), Sin90 = SinC in fig (ii) and Sin(π-C) = SinC in fig (iii) }

Therefore for all the figures,
SinC =

AD = bSinC (ii)

From (i) and (ii) we can write,

AD = bSinC = cSinB

Similarly we can show,

Combining these we get,
Proved.

The Sine Law in terms of Circum-Radius R.Statement: In any ΔABC, where R is the Circum-Radius of ΔABC.

Proof:
Consider the circum-circle of ΔABC with center O and radius R. Then we can have three possible figures.

Where the angle A is acute in fig i, or right angled in fig ii or obtuse in fig iii.
Let O be the center of the circum-circle of ΔABC and R be the circum-radius. Join BO and produce it to meet the circle at D.

Now in figure i,
BAC = BDC = A, BCD = 90º (angle at the semicircle).

= Sin(BDC)
= SinA
2R

In fig iii,
1 = Sin90º = SinA
SinA ( Since BC = BD )
SinA
2R

In fig iii,SinA
SinA
2R

Therefore in each...

The Cosine Law

Proof:
We consider a triangle ABC then we can have three possible figures where angle C is acute in figure i, right angle in figure ii and obtuse in figure iii.

From A draw AD perpendicular to BC ( Produce BC if necessary )

In ΔABC, AB²= AD²+ BD²
c²=AD²+ BD² Ⅰ

In figure (i),
AD = bSinC

Also,
DC = ACCosC = bCosC
BD = BC - DC = a-bCosC

Now from equation Ⅰ,
c²= AD²+ BD²(becomes)
c²= (bSinC)²+ (a-bCosC)²
c²= b²Sin²C+ a²- 2abCosC + b²CosC²
c²= b²+ a²- 2abCosC
2abCosC = b²+ a²- c²

Similarly in figure ii,

AB²= BC^2...

If the cosines of the two of the angles of a triangle are proportional to the opposite sides show that the triangle is isosceles.

If a = 2, b = √6, A = 45°, solve the triangle.

Prove that a2, b2, c2are in A.P. if sin A: sin C = sin (A - B): sin (B-C).

In a triangle ABC if a = 13, b = 14, c = 15, find sin A/2 , cos A/2 , tan A/2

Prove that: c² cos² B + b² cos² C + bc cos (B − C) = ½ (a² + b² + c²).

If (a+b+c)(b + c-a)=3bc, show that A = 60°.

If 8R² = a² + b² + c², prove that the triangle is right angled.

a^{2} + b^{2} + c^{2} = 8 R^{2}

sin^{2} A + sin^{2} B + sin^{2} C = 2

3 (cos 2 A + cos 2 B + cos 2 C) = 4

cos 2 A + cos 2 B + cos 2 C = 1

1 4 cos A cos B cos C = 1

cos A cos B cos C = 0 cos A = 0

cos B = 0

cos C = 0

A = 90

B = 90

C = 90

the triangle is right angled