Math, asked by saniyamansoori3687, 1 year ago

If tan (a+b)=1/root3 and tan a-b =root3 find a and b

Answers

Answered by sprao534
4

please see the attachment

Attachments:
Answered by vbhai97979
0

Answer:

Answer:-

\sf{The \ value \ of \ A \ and \ B \ are \ 18 \ and}The value of A and B are 18 and

\sf{24 \ respectively.}24 respectively.

Given:

tan(2A+B)=√3

cot(3A-B)=✓3

To find:

.

Value of A and B.

Solution:

\sf{According \ to \ the \ first \ condition.}According to the first condition.

\sf{tan(2A+B)=\sqrt3}tan(2A+B)=

3

\sf{But, \ we \ know \ tan60^\circ=\sqrt3}But, we know tan60

=

3

\sf{\therefore{2A+B=60...(1)}}∴2A+B=60...(1)

\sf{According \ to \ the \ second \ condition.}According to the second condition.

\sf{cot(3A-B)=\sqrt3}cot(3A−B)=

3

\sf{But, \ we \ know \ tan30^\circ=\sqrt3}But, we know tan30

=

3

\sf{\therefore{3A-B=30...(2)}}∴3A−B=30...(2)

\sf{Add \ equations (1) \ and \ (2), \ we \ get}Add equations(1) and (2), we get

\sf{2A+B=60}2A+B=60

\sf{+}+

\sf{3A-B=30}3A−B=30

____________________

\sf{5A=90}5A=90

\sf{\therefore{A=\frac{90}{5}}}∴A=

5

90

\boxed{\sf{\therefore{A=18}}}

∴A=18

\sf{Substitute \ A=18 \ in \ equation (1)}Substitute A=18 in equation(1)

\sf{2(18)+B=60}2(18)+B=60

\sf{\therefore{36+B=60}}∴36+B=60

\sf{\therefore{B=60-36}}∴B=60−36

\boxed{\sf{\therefore{B=24}}}

∴B=24

\sf\purple{\tt{\therefore{The \ value \ of \ A \ and \ B \ are \ 18 \ and}}}∴The value of A and B are 18 and

\sf\purple{\tt{24 \ respectively.}}24 respectively.

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