inverse trig question (1 Viewer)

i-insomnia · Feb 12, 2011

Show that:
tan^-1 (4) - tan^1 (3/5) = pi/4

sin^-1 (3/5) + tan^-1 (7/24) = cos^1 (3/5)

thanks.

Drongoski · Feb 12, 2011

i-insomnia said:
Show that:
tan^-1 (4) - tan^1 (3/5) = pi/4

thanks.

tan(LHS) = [ tan(tan^-1 {4}) - tan(tan^-1 {3/5})]/[1 + tan(tan^-1{4} )tan(tan^-1{3/5})

= [4 - 3/5 ]/[1 + 4 x (3/5) ] = [17/5] / [17/5] = 1

.: LHS = pi/4 [since its tangent = 1]

i-insomnia · Feb 12, 2011

Drongoski said:
tan(LHS) = [ tan(tan^-1 {4}) - tan(tan^-1 {3/5})]/[1 + tan(tan^-1{4} )tan(tan^-1{3/5})

sorry how did you get this step?

Drongoski · Feb 12, 2011

i-insomnia said:
sorry how did you get this step?

$tan(A -B) = \frac {tan A - tan B} {1 + tan A \times tan B }$

Remember tan^-1 4 and tan^-1 (3/5) are angles (like the A and B above)

Drongoski · Feb 12, 2011

i-insomnia said:
Show that:

sin^-1 (3/5) + tan^-1 (7/24) = cos^-1 (3/5)

thanks.

This question is a little trickier.

Remember each expression is an angle: say they are A, B, C respectively. Construct a right-angled triangle with sides: 3, 4 and 5 [easier to see what's happening this way] The angle opposite the side 3 is A, the one opp 4 is C.

$tan(sin^{-1} \frac{3}{5}) + tan(tan^{-1} \frac {7}{24}) = \frac {tan(sin^{-1} \frac {3}{5}) + tan(tan^{-1} \frac{7}{24}) }{1 - tan(sin^{-1} \frac{3}{5}) \times tan(tan^{-1} \frac{7}{24}) }$

$= \frac { \frac {3}{4} + \frac {7}{24} } { 1 - \frac {3}{4} \times \frac {7}{24} } = \frac {4}{3} = tan( cos^{-1} \frac {3}{5})$

Edit: omitted the last "tan" earlier.

bored of fail 1 · Feb 12, 2011

let A=sin^-1(3/5) -> sinA = 3/5 -> cos(A) = 4/5

B = tan^-1 ( 7/24 ) -> tan(B) = 7/24 -> sin(B) = 7/25 -> cos(B) = 24/25

now cos ( A +B) = cos(A)cos(B) - sin(A)sin(B) = (4/5)(24/25) - (3/5)(7/25) = 3/5

therefore take inverse cos both sides and result is shown

dont know what drongskis doing lol

bored of fail 1 · Feb 12, 2011

yeh thats a really complicated way of doing it drongoski lol

bored of fail 1 · Feb 12, 2011

Drongoski said:
This question is a little trickier.

Remember each expression is an angle: say they are A, B, C respectively. Construct a right-angled triangle with sides: 3, 4 and 5 [easier to see what's happening this way] The angle opposite the side 3 is A, the one opp 4 is C.

$tan(sin^{-1} \frac{3}{5}) + tan(tan^{-1} \frac {7}{24}) = \frac {tan(sin^{-1} \frac {3}{5}) + tan(tan^{-1} \frac{7}{24}) }{1 - tan(sin^{-1} \frac{3}{5}) \times tan(tan^{-1} \frac{7}{24}) }$

$= \frac { \frac {3}{4} + \frac {7}{24} } { 1 - \frac {3}{4} \times \frac {7}{24} } = \frac {4}{3} = cos^{-1} \frac {3}{5}$

lol i have idea how u got the last line 4/3 = cos^-1 3/5

jyu · Feb 12, 2011

bored of fail 1 said:
lol i have idea how u got the last line 4/3 = cos^-1 3/5

meant to be tan^-1 4/3 = cos^-1 3/5

Drongoski · Feb 12, 2011

bored of fail 1 said:
yeh thats a really complicated way of doing it drongoski lol

You are right; your way is better. Good work.

i-insomnia · Feb 12, 2011

thanks.

i-insomnia · Feb 12, 2011

do you guys mind if you help me out a bit more? ..
show that:

sin^-1(x) = cos^ -1 sqrt(1-x^2) , 0 <= x <= 1

thank you so much

bored of fail 1 · Feb 12, 2011

its just pythagorus

bored of fail 1 · Feb 12, 2011

let A= sin^-1(x)

so sin(A) = x

now we can rerite what we need to prove as sin^-1(x) = cos^-1(sqrt( 1- sin(A)^2 ) )

now the RHS = cos^-1( sqrt (cos(A) )^2 ) = cos^-1(cos(A) = A = sin^-1(x) = LHS

therefore proven

Drongoski · Feb 12, 2011

i-insomnia said:
thanks.

To whom??

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