If sinA+sinB=a and cosA+cosB=b than prove that tan(A+B)=2ab/(b^2-a^2)

0 September 04, 2021

Steps to prove tan(A+B)=2ab/(b^2-a^2)

sinA+sinB=a-(I)

cosA+cosB=b-(II)

Dividing equation (I) and (II)

⇒(sinA+sinB)/(cosA+cosB)=a/b

⇒{2sin(A+B)/2.cos(A-B)/2}/{2cos(A+B)/2.cos(A-B)/2}=a/b

⇒{sin(A+B)/2}/cos(A+B)/2}=a/b

⇒tan(A+B)/2=a/b

Take L.H.S

=tan(A+B)

=tan2(A+B)/2

={2tan(A+B)/2}/{1-tan^2(A+B)/2}

={2(a/b)}/{(b^2-a^2)/b^2}

=2ab/(b^2-a^2)

=R.H.S

Hence tan(A+B)=2ab/(b^2-a^2) is proved.

Detail Information:-

If sinA+sinB=a and cosA+cosB=b than prove that tan(A+B)=2ab/(b^2-a^2)

If sinA+sinB=a and cosA+cosB=b than prove that sin(A+B)=2ab/(b^2+a^2)
If sinA+sinB=a and cosA+cosB=b than prove that cos(A+B)=(b^2-a^2)/(b^2+a^2)
Prove that {cotA/(cotA-cot3A)}-{tanA/(tan3A-tanA)}=1
Prove that tan4θ=(4tanθ-4tan^3θ)/(1-6tan^2θ+tan^4θ)

Read-Fx

If sinA+sinB=a and cosA+cosB=b than prove that tan(A+B)=2ab/(b^2-a^2)

Steps to prove tan(A+B)=2ab/(b^2-a^2)

sinA+sinB=a-(I)

cosA+cosB=b-(II)

Dividing equation (I) and (II)

⇒(sinA+sinB)/(cosA+cosB)=a/b

⇒{2sin(A+B)/2.cos(A-B)/2}/{2cos(A+B)/2.cos(A-B)/2}=a/b

⇒{sin(A+B)/2}/cos(A+B)/2}=a/b

⇒tan(A+B)/2=a/b

Take L.H.S

=tan(A+B)

=tan2(A+B)/2

={2tan(A+B)/2}/{1-tan^2(A+B)/2}

={2(a/b)}/{(b^2-a^2)/b^2}

=2ab/(b^2-a^2)

=R.H.S

Hence tan(A+B)=2ab/(b^2-a^2) is proved.

Detail Information:-

Similar Questions For You:-

If sinA+sinB=a and cosA+cosB=b than prove that sin(A+B)=2ab/(b^2+a^2)
If sinA+sinB=a and cosA+cosB=b than prove that cos(A+B)=(b^2-a^2)/(b^2+a^2)
Prove that {cotA/(cotA-cot3A)}-{tanA/(tan3A-tanA)}=1
Prove that tan4θ=(4tanθ-4tan^3θ)/(1-6tan^2θ+tan^4θ)

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Read-Fx

If sinA+sinB=a and cosA+cosB=b than prove that tan(A+B)=2ab/(b^2-a^2)

Steps to prove tan(A+B)=2ab/(b^2-a^2)

sinA+sinB=a-(I)

cosA+cosB=b-(II)

Dividing equation (I) and (II)

⇒(sinA+sinB)/(cosA+cosB)=a/b

⇒{2sin(A+B)/2.cos(A-B)/2}/{2cos(A+B)/2.cos(A-B)/2}=a/b

⇒{sin(A+B)/2}/cos(A+B)/2}=a/b

⇒tan(A+B)/2=a/b

Take L.H.S

=tan(A+B)

=tan2(A+B)/2

={2tan(A+B)/2}/{1-tan^2(A+B)/2}

={2(a/b)}/{(b^2-a^2)/b^2}

=2ab/(b^2-a^2)

=R.H.S

Hence tan(A+B)=2ab/(b^2-a^2) is proved.

Detail Information:-

Similar Questions For You:-

If sinA+sinB=a and cosA+cosB=b than prove that sin(A+B)=2ab/(b^2+a^2) If sinA+sinB=a and cosA+cosB=b than prove that cos(A+B)=(b^2-a^2)/(b^2+a^2)Prove that {cotA/(cotA-cot3A)}-{tanA/(tan3A-tanA)}=1Prove that tan4θ=(4tanθ-4tan^3θ)/(1-6tan^2θ+tan^4θ)

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If sinA+sinB=a and cosA+cosB=b than prove that sin(A+B)=2ab/(b^2+a^2)
If sinA+sinB=a and cosA+cosB=b than prove that cos(A+B)=(b^2-a^2)/(b^2+a^2)
Prove that {cotA/(cotA-cot3A)}-{tanA/(tan3A-tanA)}=1
Prove that tan4θ=(4tanθ-4tan^3θ)/(1-6tan^2θ+tan^4θ)