If $asin^2theta-bcos^2theta=a-b$, then prove $acos^4theta+bsin^4theta=fracaba+b$ Announcing the arrival of Valued Associate #679: Cesar Manara Planned maintenance scheduled April 23, 2019 at 23:30 UTC (7:30pm US/Eastern)Find $cos(2alpha)$ given $cos(theta -alpha)$ and $sin(theta +alpha)$Proof of $cos theta+cos 2theta+cos 3theta+cdots+cos ntheta=fracsinfrac12nthetasinfrac12thetacosfrac12(n+1)theta$use De Moivre's theorem to show that: $cos(3theta) = 4cos(3theta)-3cos(theta)$ and $sin(3theta) = 3sin(theta) - 4sin(3theta)$Prove that $sin^6fractheta2+cos^6fractheta2=frac14(1+3cos^2theta)$Prove $fracsintheta-costheta+1sintheta+costheta-1=frac1+sinthetacostheta$Prove $frac2sectheta +3tantheta+5sintheta-7costheta+52tantheta +3sectheta+5costheta+7sintheta+8=frac1-costhetasintheta$Show that $sin^2 theta cdot cos^2theta = (1/8)[1 - cos(4 theta)]$.Please prove $frac1 + sintheta - costheta1 + sintheta + costheta = tan left(frac theta 2right)$How to express $theta$ in terms of $x$ where $3sin(3theta+x)=frac2.5sintheta$?Why $4cos^3theta=3sintheta$?
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If $asin^2theta-bcos^2theta=a-b$, then prove $acos^4theta+bsin^4theta=fracaba+b$
Announcing the arrival of Valued Associate #679: Cesar Manara
Planned maintenance scheduled April 23, 2019 at 23:30 UTC (7:30pm US/Eastern)Find $cos(2alpha)$ given $cos(theta -alpha)$ and $sin(theta +alpha)$Proof of $cos theta+cos 2theta+cos 3theta+cdots+cos ntheta=fracsinfrac12nthetasinfrac12thetacosfrac12(n+1)theta$use De Moivre's theorem to show that: $cos(3theta) = 4cos(3theta)-3cos(theta)$ and $sin(3theta) = 3sin(theta) - 4sin(3theta)$Prove that $sin^6fractheta2+cos^6fractheta2=frac14(1+3cos^2theta)$Prove $fracsintheta-costheta+1sintheta+costheta-1=frac1+sinthetacostheta$Prove $frac2sectheta +3tantheta+5sintheta-7costheta+52tantheta +3sectheta+5costheta+7sintheta+8=frac1-costhetasintheta$Show that $sin^2 theta cdot cos^2theta = (1/8)[1 - cos(4 theta)]$.Please prove $frac1 + sintheta - costheta1 + sintheta + costheta = tan left(frac theta 2right)$How to express $theta$ in terms of $x$ where $3sin(3theta+x)=frac2.5sintheta$?Why $4cos^3theta=3sintheta$?
$begingroup$
If
$$asin^2theta-bcos^2theta=a-b$$
then prove
$$acos^4 theta +bsin^4 theta=fracaba+b$$
I have tried some ways to solve the answer but didn't succeed. Such as:
$$beginalign
acos^4 theta +bsin^4 theta &= b(cos^4theta+sin^4theta)+(a-b)cos^4theta \
&=b(1-2cos^2thetasin^2theta)+(asin^2theta-bcos^2theta)cos^4theta
endalign$$
and here I'm stuck because I'll have $bcos^6theta$ and somethings like these.
Or this way:
$$beginalign
asin^2 theta -bcos^2 theta &= a-b \
Rightarrowqquad asin^2theta-b(1-sin^2theta)&=a-b \
Rightarrowqquad asin^2theta + sin^2theta &=a-b \
Rightarrowqquad sintheta(a+1)&=a
endalign$$
But when I want to use $sin^2theta=1-cos^2theta$ in my main proof, I can't because there is $sin^4$ and $cos^4$, and it'll be a long polynomial. I don't find a way to the answer and the proof.
trigonometry
edited Apr 2 at 23:35
Blue
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
$endgroup$
|
show 1 more comment
$begingroup$
If
$$asin^2theta-bcos^2theta=a-b$$
then prove
$$acos^4 theta +bsin^4 theta=fracaba+b$$
I have tried some ways to solve the answer but didn't succeed. Such as:
$$beginalign
acos^4 theta +bsin^4 theta &= b(cos^4theta+sin^4theta)+(a-b)cos^4theta \
&=b(1-2cos^2thetasin^2theta)+(asin^2theta-bcos^2theta)cos^4theta
endalign$$
and here I'm stuck because I'll have $bcos^6theta$ and somethings like these.
Or this way:
$$beginalign
asin^2 theta -bcos^2 theta &= a-b \
Rightarrowqquad asin^2theta-b(1-sin^2theta)&=a-b \
Rightarrowqquad asin^2theta + sin^2theta &=a-b \
Rightarrowqquad sintheta(a+1)&=a
endalign$$
But when I want to use $sin^2theta=1-cos^2theta$ in my main proof, I can't because there is $sin^4$ and $cos^4$, and it'll be a long polynomial. I don't find a way to the answer and the proof.
trigonometry
edited Apr 2 at 23:35
Blue
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
$endgroup$
1
$begingroup$
Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
1
$begingroup$
Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
$endgroup$
– T. Bongers
Apr 2 at 17:22
$begingroup$
Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
$endgroup$
– alilolo
Apr 2 at 17:28
1
$begingroup$
alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
$endgroup$
– Ennar
Apr 2 at 17:30
1
$begingroup$
I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23
|
show 1 more comment
$begingroup$
If
$$asin^2theta-bcos^2theta=a-b$$
then prove
$$acos^4 theta +bsin^4 theta=fracaba+b$$
I have tried some ways to solve the answer but didn't succeed. Such as:
$$beginalign
acos^4 theta +bsin^4 theta &= b(cos^4theta+sin^4theta)+(a-b)cos^4theta \
&=b(1-2cos^2thetasin^2theta)+(asin^2theta-bcos^2theta)cos^4theta
endalign$$
and here I'm stuck because I'll have $bcos^6theta$ and somethings like these.
Or this way:
$$beginalign
asin^2 theta -bcos^2 theta &= a-b \
Rightarrowqquad asin^2theta-b(1-sin^2theta)&=a-b \
Rightarrowqquad asin^2theta + sin^2theta &=a-b \
Rightarrowqquad sintheta(a+1)&=a
endalign$$
But when I want to use $sin^2theta=1-cos^2theta$ in my main proof, I can't because there is $sin^4$ and $cos^4$, and it'll be a long polynomial. I don't find a way to the answer and the proof.
trigonometry
edited Apr 2 at 23:35
Blue
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
$endgroup$
If
$$asin^2theta-bcos^2theta=a-b$$
then prove
$$acos^4 theta +bsin^4 theta=fracaba+b$$
I have tried some ways to solve the answer but didn't succeed. Such as:
$$beginalign
acos^4 theta +bsin^4 theta &= b(cos^4theta+sin^4theta)+(a-b)cos^4theta \
&=b(1-2cos^2thetasin^2theta)+(asin^2theta-bcos^2theta)cos^4theta
endalign$$
and here I'm stuck because I'll have $bcos^6theta$ and somethings like these.
Or this way:
$$beginalign
asin^2 theta -bcos^2 theta &= a-b \
Rightarrowqquad asin^2theta-b(1-sin^2theta)&=a-b \
Rightarrowqquad asin^2theta + sin^2theta &=a-b \
Rightarrowqquad sintheta(a+1)&=a
endalign$$
But when I want to use $sin^2theta=1-cos^2theta$ in my main proof, I can't because there is $sin^4$ and $cos^4$, and it'll be a long polynomial. I don't find a way to the answer and the proof.
trigonometry
trigonometry
edited Apr 2 at 23:35
Blue
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
edited Apr 2 at 23:35
Blue
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
edited Apr 2 at 23:35
Blue
49.8k870158
edited Apr 2 at 23:35
Blue
49.8k870158
edited Apr 2 at 23:35
Blue
49.8k870158
49.8k870158
asked Apr 2 at 17:20
aliloloalilolo
185
asked Apr 2 at 17:20
aliloloalilolo
185
asked Apr 2 at 17:20
aliloloalilolo
185
185
1
$begingroup$
Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
1
$begingroup$
Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
$endgroup$
– T. Bongers
Apr 2 at 17:22
$begingroup$
Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
$endgroup$
– alilolo
Apr 2 at 17:28
1
$begingroup$
alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
$endgroup$
– Ennar
Apr 2 at 17:30
1
$begingroup$
I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23
|
show 1 more comment
1
$begingroup$
Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
1
$begingroup$
Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
$endgroup$
– T. Bongers
Apr 2 at 17:22
$begingroup$
Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
$endgroup$
– alilolo
Apr 2 at 17:28
1
$begingroup$
alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
$endgroup$
– Ennar
Apr 2 at 17:30
1
$begingroup$
I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23
1
1
$begingroup$
Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
$begingroup$
Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
1
1
$begingroup$
Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
$endgroup$
– T. Bongers
Apr 2 at 17:22
$begingroup$
Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
$endgroup$
– T. Bongers
Apr 2 at 17:22
$begingroup$
Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
$endgroup$
– alilolo
Apr 2 at 17:28
$begingroup$
Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
$endgroup$
– alilolo
Apr 2 at 17:28
1
1
$begingroup$
alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
$endgroup$
– Ennar
Apr 2 at 17:30
$begingroup$
alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
$endgroup$
– Ennar
Apr 2 at 17:30
1
1
$begingroup$
I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23
$begingroup$
I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23
|
show 1 more comment
4 Answers
4
active
oldest
votes
$begingroup$
We are given $$asin^2theta-bcos^2theta=a-b$$
Note that the given equation implies
$$beginalign
a(1-cos^2theta)-b(1-sin^2theta)&=a-b tag1\[4pt]
bsin^2theta-acos^2theta&=0 tag2 \[4pt]
tan^2theta&=fracab tag3 \[4pt]
tantheta&=sqrtfracab tag4
endalign$$
We can construct a triangle and deduce:
$$costheta=fracsqrtbsqrta+b qquad
sintheta=fracsqrtasqrta+b tag5$$
Then, we can sub the result above into $acos^4theta+bsin^4theta$ and obtain the desired result
$$beginalign
acos^4theta+bsin^4theta
&= aleft(fracsqrtbsqrta+bright)^4+bleft(fracsqrtasqrta+bright)^4 tag6\[4pt]
&=ableft(fracb(a+b)^2+fraca(a+b)^2right) tag7\[4pt]
&=abcdot frac1a+b tag8\[4pt]
&=fracaba+b tag9
endalign$$
edited Apr 3 at 0:03
Blue
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
$endgroup$
add a comment |
$begingroup$
Hint:
$$b(1-cos^2theta)=a(1-sin^2theta)$$
$$iffdfrac asin^2theta=dfrac bcos^2theta=dfraca+bsin^2theta+cos^2theta$$
$sin^2theta=dfrac aa+bimpliessin^4theta=left(dfrac aa+bright)^2$
Similarly, $cos^4theta=left(dfrac ba+bright)^2$
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
$endgroup$
add a comment |
$begingroup$
Variation of lab bhattacharjee's answer.
From the given:
$$asin^2theta-bcos^2theta=a-b iff bsin^2 theta=acos^2 theta iff fracab=tan^2theta.$$
Use:
$$tan^2theta +1=frac1cos^2theta Rightarrow cos^2theta =frac11+tan^2theta$$
to get:
$$beginalignacos^4 theta +bsin^4 theta&=acos^4theta+acos^2thetasin^2theta=\
&=acos^2theta=\
&=acdot frac11+tan^2theta=\
&=acdot frac11+frac ab=\
&=fracaba+b.
endalign$$
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
$endgroup$
add a comment |
$begingroup$
You made an error in your second attempt: $$asin^2theta-b(1-sin^2theta)=a-b$$ doesn't imply $$asin^2theta + sin^2theta =a-b,$$ but $$asin^2theta -b + bsin^2theta = a - b,$$ which would then give you $sin^2theta = frac aa+b$ and $cos^2theta = 1 - sin^2theta = frac ba+b$. You can square it and substitute into the identity you want to prove.
I'll use the same idea, but with substitution $u = sin^2theta$.
Then, $cos^2theta = 1 - sin^2theta = 1- u$ and we want to prove
$$au-b(1-u) = a - bimplies a(1-u)^2+bu^2 = fracaba+b.$$
Solving the first equation for $u$ we get $u = frac aa+b$, so
beginalign
a(1-u)^2 + bu^2 &= a(1-frac aa+b)^2+b(frac aa+b)^2\
&= fracab^2(a+b)^2+ fraca^2b(a+b)^2\
&= fracab(a+b)(a+b)^2\
&=fracaba+b.
endalign
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
$endgroup$
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
add a comment |
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4 Answers
4
active
oldest
votes
4 Answers
4
active
oldest
votes
active
oldest
votes
active
oldest
votes
$begingroup$
We are given $$asin^2theta-bcos^2theta=a-b$$
Note that the given equation implies
$$beginalign
a(1-cos^2theta)-b(1-sin^2theta)&=a-b tag1\[4pt]
bsin^2theta-acos^2theta&=0 tag2 \[4pt]
tan^2theta&=fracab tag3 \[4pt]
tantheta&=sqrtfracab tag4
endalign$$
We can construct a triangle and deduce:
$$costheta=fracsqrtbsqrta+b qquad
sintheta=fracsqrtasqrta+b tag5$$
Then, we can sub the result above into $acos^4theta+bsin^4theta$ and obtain the desired result
$$beginalign
acos^4theta+bsin^4theta
&= aleft(fracsqrtbsqrta+bright)^4+bleft(fracsqrtasqrta+bright)^4 tag6\[4pt]
&=ableft(fracb(a+b)^2+fraca(a+b)^2right) tag7\[4pt]
&=abcdot frac1a+b tag8\[4pt]
&=fracaba+b tag9
endalign$$
edited Apr 3 at 0:03
Blue
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
$endgroup$
add a comment |
$begingroup$
We are given $$asin^2theta-bcos^2theta=a-b$$
Note that the given equation implies
$$beginalign
a(1-cos^2theta)-b(1-sin^2theta)&=a-b tag1\[4pt]
bsin^2theta-acos^2theta&=0 tag2 \[4pt]
tan^2theta&=fracab tag3 \[4pt]
tantheta&=sqrtfracab tag4
endalign$$
We can construct a triangle and deduce:
$$costheta=fracsqrtbsqrta+b qquad
sintheta=fracsqrtasqrta+b tag5$$
Then, we can sub the result above into $acos^4theta+bsin^4theta$ and obtain the desired result
$$beginalign
acos^4theta+bsin^4theta
&= aleft(fracsqrtbsqrta+bright)^4+bleft(fracsqrtasqrta+bright)^4 tag6\[4pt]
&=ableft(fracb(a+b)^2+fraca(a+b)^2right) tag7\[4pt]
&=abcdot frac1a+b tag8\[4pt]
&=fracaba+b tag9
endalign$$
edited Apr 3 at 0:03
Blue
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
$endgroup$
add a comment |
$begingroup$
We are given $$asin^2theta-bcos^2theta=a-b$$
Note that the given equation implies
$$beginalign
a(1-cos^2theta)-b(1-sin^2theta)&=a-b tag1\[4pt]
bsin^2theta-acos^2theta&=0 tag2 \[4pt]
tan^2theta&=fracab tag3 \[4pt]
tantheta&=sqrtfracab tag4
endalign$$
We can construct a triangle and deduce:
$$costheta=fracsqrtbsqrta+b qquad
sintheta=fracsqrtasqrta+b tag5$$
Then, we can sub the result above into $acos^4theta+bsin^4theta$ and obtain the desired result
$$beginalign
acos^4theta+bsin^4theta
&= aleft(fracsqrtbsqrta+bright)^4+bleft(fracsqrtasqrta+bright)^4 tag6\[4pt]
&=ableft(fracb(a+b)^2+fraca(a+b)^2right) tag7\[4pt]
&=abcdot frac1a+b tag8\[4pt]
&=fracaba+b tag9
endalign$$
edited Apr 3 at 0:03
Blue
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
$endgroup$
We are given $$asin^2theta-bcos^2theta=a-b$$
Note that the given equation implies
$$beginalign
a(1-cos^2theta)-b(1-sin^2theta)&=a-b tag1\[4pt]
bsin^2theta-acos^2theta&=0 tag2 \[4pt]
tan^2theta&=fracab tag3 \[4pt]
tantheta&=sqrtfracab tag4
endalign$$
We can construct a triangle and deduce:
$$costheta=fracsqrtbsqrta+b qquad
sintheta=fracsqrtasqrta+b tag5$$
Then, we can sub the result above into $acos^4theta+bsin^4theta$ and obtain the desired result
$$beginalign
acos^4theta+bsin^4theta
&= aleft(fracsqrtbsqrta+bright)^4+bleft(fracsqrtasqrta+bright)^4 tag6\[4pt]
&=ableft(fracb(a+b)^2+fraca(a+b)^2right) tag7\[4pt]
&=abcdot frac1a+b tag8\[4pt]
&=fracaba+b tag9
endalign$$
edited Apr 3 at 0:03
Blue
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
edited Apr 3 at 0:03
Blue
49.8k870158
edited Apr 3 at 0:03
Blue
49.8k870158
edited Apr 3 at 0:03
Blue
49.8k870158
49.8k870158
answered Apr 2 at 23:50
CColaCCola
1317
answered Apr 2 at 23:50
CColaCCola
1317
answered Apr 2 at 23:50
CColaCCola
1317
1317
add a comment |
add a comment |
$begingroup$
Hint:
$$b(1-cos^2theta)=a(1-sin^2theta)$$
$$iffdfrac asin^2theta=dfrac bcos^2theta=dfraca+bsin^2theta+cos^2theta$$
$sin^2theta=dfrac aa+bimpliessin^4theta=left(dfrac aa+bright)^2$
Similarly, $cos^4theta=left(dfrac ba+bright)^2$
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
$endgroup$
add a comment |
$begingroup$
Hint:
$$b(1-cos^2theta)=a(1-sin^2theta)$$
$$iffdfrac asin^2theta=dfrac bcos^2theta=dfraca+bsin^2theta+cos^2theta$$
$sin^2theta=dfrac aa+bimpliessin^4theta=left(dfrac aa+bright)^2$
Similarly, $cos^4theta=left(dfrac ba+bright)^2$
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
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Hint:
$$b(1-cos^2theta)=a(1-sin^2theta)$$
$$iffdfrac asin^2theta=dfrac bcos^2theta=dfraca+bsin^2theta+cos^2theta$$
$sin^2theta=dfrac aa+bimpliessin^4theta=left(dfrac aa+bright)^2$
Similarly, $cos^4theta=left(dfrac ba+bright)^2$
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
$endgroup$
Hint:
$$b(1-cos^2theta)=a(1-sin^2theta)$$
$$iffdfrac asin^2theta=dfrac bcos^2theta=dfraca+bsin^2theta+cos^2theta$$
$sin^2theta=dfrac aa+bimpliessin^4theta=left(dfrac aa+bright)^2$
Similarly, $cos^4theta=left(dfrac ba+bright)^2$
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
answered Apr 3 at 6:13
lab bhattacharjeelab bhattacharjee
229k15159279
229k15159279
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add a comment |
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Variation of lab bhattacharjee's answer.
From the given:
$$asin^2theta-bcos^2theta=a-b iff bsin^2 theta=acos^2 theta iff fracab=tan^2theta.$$
Use:
$$tan^2theta +1=frac1cos^2theta Rightarrow cos^2theta =frac11+tan^2theta$$
to get:
$$beginalignacos^4 theta +bsin^4 theta&=acos^4theta+acos^2thetasin^2theta=\
&=acos^2theta=\
&=acdot frac11+tan^2theta=\
&=acdot frac11+frac ab=\
&=fracaba+b.
endalign$$
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
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add a comment |
$begingroup$
Variation of lab bhattacharjee's answer.
From the given:
$$asin^2theta-bcos^2theta=a-b iff bsin^2 theta=acos^2 theta iff fracab=tan^2theta.$$
Use:
$$tan^2theta +1=frac1cos^2theta Rightarrow cos^2theta =frac11+tan^2theta$$
to get:
$$beginalignacos^4 theta +bsin^4 theta&=acos^4theta+acos^2thetasin^2theta=\
&=acos^2theta=\
&=acdot frac11+tan^2theta=\
&=acdot frac11+frac ab=\
&=fracaba+b.
endalign$$
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
$endgroup$
add a comment |
$begingroup$
Variation of lab bhattacharjee's answer.
From the given:
$$asin^2theta-bcos^2theta=a-b iff bsin^2 theta=acos^2 theta iff fracab=tan^2theta.$$
Use:
$$tan^2theta +1=frac1cos^2theta Rightarrow cos^2theta =frac11+tan^2theta$$
to get:
$$beginalignacos^4 theta +bsin^4 theta&=acos^4theta+acos^2thetasin^2theta=\
&=acos^2theta=\
&=acdot frac11+tan^2theta=\
&=acdot frac11+frac ab=\
&=fracaba+b.
endalign$$
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
$endgroup$
Variation of lab bhattacharjee's answer.
From the given:
$$asin^2theta-bcos^2theta=a-b iff bsin^2 theta=acos^2 theta iff fracab=tan^2theta.$$
Use:
$$tan^2theta +1=frac1cos^2theta Rightarrow cos^2theta =frac11+tan^2theta$$
to get:
$$beginalignacos^4 theta +bsin^4 theta&=acos^4theta+acos^2thetasin^2theta=\
&=acos^2theta=\
&=acdot frac11+tan^2theta=\
&=acdot frac11+frac ab=\
&=fracaba+b.
endalign$$
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
answered Apr 3 at 8:13
farruhotafarruhota
22.5k2942
22.5k2942
add a comment |
add a comment |
$begingroup$
You made an error in your second attempt: $$asin^2theta-b(1-sin^2theta)=a-b$$ doesn't imply $$asin^2theta + sin^2theta =a-b,$$ but $$asin^2theta -b + bsin^2theta = a - b,$$ which would then give you $sin^2theta = frac aa+b$ and $cos^2theta = 1 - sin^2theta = frac ba+b$. You can square it and substitute into the identity you want to prove.
I'll use the same idea, but with substitution $u = sin^2theta$.
Then, $cos^2theta = 1 - sin^2theta = 1- u$ and we want to prove
$$au-b(1-u) = a - bimplies a(1-u)^2+bu^2 = fracaba+b.$$
Solving the first equation for $u$ we get $u = frac aa+b$, so
beginalign
a(1-u)^2 + bu^2 &= a(1-frac aa+b)^2+b(frac aa+b)^2\
&= fracab^2(a+b)^2+ fraca^2b(a+b)^2\
&= fracab(a+b)(a+b)^2\
&=fracaba+b.
endalign
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
$endgroup$
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
add a comment |
$begingroup$
You made an error in your second attempt: $$asin^2theta-b(1-sin^2theta)=a-b$$ doesn't imply $$asin^2theta + sin^2theta =a-b,$$ but $$asin^2theta -b + bsin^2theta = a - b,$$ which would then give you $sin^2theta = frac aa+b$ and $cos^2theta = 1 - sin^2theta = frac ba+b$. You can square it and substitute into the identity you want to prove.
I'll use the same idea, but with substitution $u = sin^2theta$.
Then, $cos^2theta = 1 - sin^2theta = 1- u$ and we want to prove
$$au-b(1-u) = a - bimplies a(1-u)^2+bu^2 = fracaba+b.$$
Solving the first equation for $u$ we get $u = frac aa+b$, so
beginalign
a(1-u)^2 + bu^2 &= a(1-frac aa+b)^2+b(frac aa+b)^2\
&= fracab^2(a+b)^2+ fraca^2b(a+b)^2\
&= fracab(a+b)(a+b)^2\
&=fracaba+b.
endalign
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
$endgroup$
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
add a comment |
$begingroup$
You made an error in your second attempt: $$asin^2theta-b(1-sin^2theta)=a-b$$ doesn't imply $$asin^2theta + sin^2theta =a-b,$$ but $$asin^2theta -b + bsin^2theta = a - b,$$ which would then give you $sin^2theta = frac aa+b$ and $cos^2theta = 1 - sin^2theta = frac ba+b$. You can square it and substitute into the identity you want to prove.
I'll use the same idea, but with substitution $u = sin^2theta$.
Then, $cos^2theta = 1 - sin^2theta = 1- u$ and we want to prove
$$au-b(1-u) = a - bimplies a(1-u)^2+bu^2 = fracaba+b.$$
Solving the first equation for $u$ we get $u = frac aa+b$, so
beginalign
a(1-u)^2 + bu^2 &= a(1-frac aa+b)^2+b(frac aa+b)^2\
&= fracab^2(a+b)^2+ fraca^2b(a+b)^2\
&= fracab(a+b)(a+b)^2\
&=fracaba+b.
endalign
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
$endgroup$
You made an error in your second attempt: $$asin^2theta-b(1-sin^2theta)=a-b$$ doesn't imply $$asin^2theta + sin^2theta =a-b,$$ but $$asin^2theta -b + bsin^2theta = a - b,$$ which would then give you $sin^2theta = frac aa+b$ and $cos^2theta = 1 - sin^2theta = frac ba+b$. You can square it and substitute into the identity you want to prove.
I'll use the same idea, but with substitution $u = sin^2theta$.
Then, $cos^2theta = 1 - sin^2theta = 1- u$ and we want to prove
$$au-b(1-u) = a - bimplies a(1-u)^2+bu^2 = fracaba+b.$$
Solving the first equation for $u$ we get $u = frac aa+b$, so
beginalign
a(1-u)^2 + bu^2 &= a(1-frac aa+b)^2+b(frac aa+b)^2\
&= fracab^2(a+b)^2+ fraca^2b(a+b)^2\
&= fracab(a+b)(a+b)^2\
&=fracaba+b.
endalign
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
answered Apr 3 at 8:48
EnnarEnnar
14.8k32445
14.8k32445
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
add a comment |
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
Yes . That was a mistake but the next line is correct and that was just a mistake in typing my notes.
$endgroup$
– alilolo
Apr 3 at 9:23
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
$begingroup$
@alilolo, no, you didn't get the correct result in the end.
$endgroup$
– Ennar
Apr 3 at 9:25
add a comment |
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1
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Use $cos^2theta=1-sin^2theta$ to remove all appearances of cosines from both equations.
$endgroup$
– J.G.
Apr 2 at 17:22
1
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Welcome to MSE. This is not a do-my-homework site, so please edit your question accordingly. (-1) and voting to close.
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– T. Bongers
Apr 2 at 17:22
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Sorry Sir! Yes unfortunately this is my homework but I really can't solve it although I tried hard! Now how do I have to edit my post?
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– alilolo
Apr 2 at 17:28
1
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alilolo, J.G. gave you a hint that leads to a solution of the problem. Why don't you try it and edit your question to include your work and where you are getting stuck.
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– Ennar
Apr 2 at 17:30
1
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I edited my question as you said . I hope it is better now! Can you help me now?
$endgroup$
– alilolo
Apr 2 at 19:23