Establish the Trig Identity
Let t = theta
(csc(t) + cot(t)(csc(t) - cot(t)) = 1
2007-07-13 23:15:48 · 7 answers · asked by Sharkman 1 in Science & Mathematics ➔ Mathematics
Hi,
(csc(t) + cot(t)(csc(t) - cot(t)) = 1
Multiply this together. You get:
csc²(t) - cot²(t) = 1
This is one of the Pythagorean Identities in Trig.
To see that it is true, change each function back into its relationship to the sides of the triangle.
csc²(t) - cot²(t) = 1
hyp².......adj²
------..-..------..=..1
opp².....opp²
Multiplying by opp² to eliminate the fractions gives
hyp²..-..adj²..=..opp²
This is the same as:
hyp²..=..adj²..+..opp² OR
c² = a² + b²
I hope that helps.
2007-07-13 23:29:51 · answer #1 · answered by Pi R Squared 7 · 0⤊ 1⤋
I find the best thing to do when you have to memorize a lot of formulas is to make some flashcards. Within just a few sessions, one can easily memorize 15-20 formulas. I once used that method to memorize over 130 formulas for an actuary exam. Another trick: take the derivative of some of your functions. You should be able to calculate the derivative of tanx by translating to sinx and cosx and applying the quotient rule. One more trick: use your graphing calc. to your advantage. If you have a TI-89 you shouldn't have any problems as that calculator can compute most integrals explicitly. But, if you have a TI-83 or TI-84 you can still use numerical integral to check your answers. I find it amazing how many students don't use their graphing calculators to their full advantage. I've had many perfect tests, because I checked my work so carefully with a graphing calc. Final trick: when you're given a bunch of tanx's and secx's you can always convert these to sinx and cosx, and you should know what the integral of sinx and cosx are, and be able to use a reduction formula if needed.
2016-04-01 03:45:12 · answer #2 · answered by ? 4 · 0⤊ 0⤋
(csc + cot)(csc - cot)
= (csc)^2 + (cot)(csc) - (cot)(csc) - (cot^2)
= (csc^2) - (cot^2)
= (1/sin^2) - (cos^2 / sin^2)
= (1 - cos^2) / sin^2
= sin^2 / sin^2
= 1
2007-07-14 00:56:01 · answer #3 · answered by Mathematica 7 · 0⤊ 0⤋
(csc(t) + cot(t)(csc(t) - cot(t)) = 1
Taking left handside
LHS
(csc(t) + cot(t)(csc(t) - cot(t))
=csc^2(t) -cot^2(t)
=1/sin^2(t) - cos^2(t)/sin^2(t)
= (1 -cos^2(t))/sin^2(t)
=sin^2(t)/sin^2(t)
=1
=RHS
2007-07-14 00:07:59 · answer #4 · answered by Tubby 5 · 0⤊ 0⤋
(csc(t) + cot(t)(csc(t) - cot(t))
=csc^2(t) -cot^2(t)
=1/sin^2(t) - cos^2(t)/sin^2(t)
= (1 -cos^2(t))/sin^2(t)
=sin^2(t)/sin^2(t)
=1
2007-07-13 23:23:07 · answer #5 · answered by Anonymous · 0⤊ 1⤋
(csc(t)+cot(t))(csc(t)-cot(t)) = (csc^2(t)-cot^2(t))
= (1/sin^2(t)-cot^2(t)) because csc(t)=1/sin(t)
= [(1/sin^2(t))-(cos^2(t)/sin^2(t))]
bcs cot(t)=cos(t)/sin(t)
= [(1-cos^2(t)]/sin^2(t)
= sin^(t)/sin^2(t) bcs1-cos^2(t)=sin^2(t)
= 1
HENCE PROVED
2007-07-13 23:43:16 · answer #6 · answered by Anonymous · 0⤊ 1⤋
(cosec θ + cot θ) (cosec θ - cot θ)
= cosec ² θ - cot ² θ
= 1 / sin ² θ - cos² θ / sin ² θ
= (1 - cos ² θ) / sin ² θ
= sin ² θ / sin ² θ
= 1
2007-07-14 02:27:11 · answer #7 · answered by Como 7 · 0⤊ 0⤋