Are all values of $x$ solutions for $e^2ln(sin(x)) = 1 - e^2ln(cos(x))$ in $mathbb R$?How can I solve system of linear equations over finite fields in WolframAlpha?Trouble with Logarithmic DifferentiationDifferent results when integrating 1/(x^2-9) with computer toolsDoes this Diophantine inequality have any solutions for $p, q in mathbbN$?Is the solution from wolfram alpha for $x^4+bx^3+f=0$ only wrong for $b=0$?Wolfram Alpha gives wrongs answer for an equationFind all $m$ for which $log_3(x - m) + log_3(x) = log_3(3x - 4)$ has only one solution over reals.WolframAlpha's problems with equations involving the floor operationDefinition of the complex $log^z z$ to know the solutions of $Re log^x x=Im log^x x$ when $x$ runs over the reals between $0$ and $1$Calculating Fourier series of $cos^2(t)$ gives unexpected result
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Are all values of $x$ solutions for $e^2ln(sin(x)) = 1 - e^2ln(cos(x))$ in $mathbb R$?
How can I solve system of linear equations over finite fields in WolframAlpha?Trouble with Logarithmic DifferentiationDifferent results when integrating 1/(x^2-9) with computer toolsDoes this Diophantine inequality have any solutions for $p, q in mathbbN$?Is the solution from wolfram alpha for $x^4+bx^3+f=0$ only wrong for $b=0$?Wolfram Alpha gives wrongs answer for an equationFind all $m$ for which $log_3(x - m) + log_3(x) = log_3(3x - 4)$ has only one solution over reals.WolframAlpha's problems with equations involving the floor operationDefinition of the complex $log^z z$ to know the solutions of $Re log^x x=Im log^x x$ when $x$ runs over the reals between $0$ and $1$Calculating Fourier series of $cos^2(t)$ gives unexpected result
$begingroup$
Does all values of $x$ in $mathbb R$ satisfy equation: $$e^2ln(sin(x)) = 1 - e^2ln(cos(x))$$
I am asking this, because by checking WolframAlpha solution there is an answer: (all values for $x$ are solutions over reals), but we know that $ln(0)$ is undefined, same for negative numbers.
Wolfram Alpha solution
Therefore I assume in $mathbb R$, zero and negative numbers doesn't satisfy this equation.
logarithms wolfram-alpha
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
$endgroup$
add a comment |
$begingroup$
Does all values of $x$ in $mathbb R$ satisfy equation: $$e^2ln(sin(x)) = 1 - e^2ln(cos(x))$$
I am asking this, because by checking WolframAlpha solution there is an answer: (all values for $x$ are solutions over reals), but we know that $ln(0)$ is undefined, same for negative numbers.
Wolfram Alpha solution
Therefore I assume in $mathbb R$, zero and negative numbers doesn't satisfy this equation.
logarithms wolfram-alpha
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
$endgroup$
$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53
add a comment |
$begingroup$
Does all values of $x$ in $mathbb R$ satisfy equation: $$e^2ln(sin(x)) = 1 - e^2ln(cos(x))$$
I am asking this, because by checking WolframAlpha solution there is an answer: (all values for $x$ are solutions over reals), but we know that $ln(0)$ is undefined, same for negative numbers.
Wolfram Alpha solution
Therefore I assume in $mathbb R$, zero and negative numbers doesn't satisfy this equation.
logarithms wolfram-alpha
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
$endgroup$
Does all values of $x$ in $mathbb R$ satisfy equation: $$e^2ln(sin(x)) = 1 - e^2ln(cos(x))$$
I am asking this, because by checking WolframAlpha solution there is an answer: (all values for $x$ are solutions over reals), but we know that $ln(0)$ is undefined, same for negative numbers.
Wolfram Alpha solution
Therefore I assume in $mathbb R$, zero and negative numbers doesn't satisfy this equation.
logarithms wolfram-alpha
logarithms wolfram-alpha
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
edited Mar 13 at 18:07
Maria Mazur
47.7k1260120
47.7k1260120
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
asked Mar 13 at 17:50
Peter ParadaPeter Parada
1086
1086
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
New contributor
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
Peter Parada is a new contributor to this site. Take care in asking for clarification, commenting, and answering.
Check out our Code of Conduct.
$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53
add a comment |
$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53
$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53
add a comment |
2 Answers
2
active
oldest
votes
$begingroup$
$$1=e^2lnsin(x) +e^2ln cos(x)= e^lnsin^2(x)+e^ln cos^2(x) = $$
$$ = sin^2(x)+cos^2(x) = 1 $$
So this is true for all $x$ such that $sin x>0$ and $cos x>0$ (because then is $ln $ defined).
So $$boxedxin colorredbigcup_kin mathbbZ (0+2pi k,piover 2+2pi k)$$
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
$endgroup$
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
add a comment |
$begingroup$
Note that :
$$e^2ln sin x + e^2 ln cos x = 1 Rightarrow e^ln (sin x)^2 + e^ln (cos x)^2 = 1 Leftrightarrow sin^2x + cos^2x = 1 rightarrow texttrue ; forall x in mathbb R$$
Restrictions apply so as the initial expression holds, so that narrows down the solution set. Note the usage of $Rightarrow$ instead of an $Leftrightarrow$ at the start.
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
$endgroup$
add a comment |
Your Answer
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2 Answers
2
active
oldest
votes
2 Answers
2
active
oldest
votes
active
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votes
active
oldest
votes
$begingroup$
$$1=e^2lnsin(x) +e^2ln cos(x)= e^lnsin^2(x)+e^ln cos^2(x) = $$
$$ = sin^2(x)+cos^2(x) = 1 $$
So this is true for all $x$ such that $sin x>0$ and $cos x>0$ (because then is $ln $ defined).
So $$boxedxin colorredbigcup_kin mathbbZ (0+2pi k,piover 2+2pi k)$$
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
$endgroup$
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
add a comment |
$begingroup$
$$1=e^2lnsin(x) +e^2ln cos(x)= e^lnsin^2(x)+e^ln cos^2(x) = $$
$$ = sin^2(x)+cos^2(x) = 1 $$
So this is true for all $x$ such that $sin x>0$ and $cos x>0$ (because then is $ln $ defined).
So $$boxedxin colorredbigcup_kin mathbbZ (0+2pi k,piover 2+2pi k)$$
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
$endgroup$
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
add a comment |
$begingroup$
$$1=e^2lnsin(x) +e^2ln cos(x)= e^lnsin^2(x)+e^ln cos^2(x) = $$
$$ = sin^2(x)+cos^2(x) = 1 $$
So this is true for all $x$ such that $sin x>0$ and $cos x>0$ (because then is $ln $ defined).
So $$boxedxin colorredbigcup_kin mathbbZ (0+2pi k,piover 2+2pi k)$$
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
$endgroup$
$$1=e^2lnsin(x) +e^2ln cos(x)= e^lnsin^2(x)+e^ln cos^2(x) = $$
$$ = sin^2(x)+cos^2(x) = 1 $$
So this is true for all $x$ such that $sin x>0$ and $cos x>0$ (because then is $ln $ defined).
So $$boxedxin colorredbigcup_kin mathbbZ (0+2pi k,piover 2+2pi k)$$
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
edited Mar 13 at 18:03
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
answered Mar 13 at 17:58
Maria MazurMaria Mazur
47.7k1260120
47.7k1260120
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
add a comment |
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
$begingroup$
Great. I was thinking the same. Does that mean solution on Wolfram is wrong?
$endgroup$
– Peter Parada
Mar 13 at 18:04
1
1
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
(+1) For myself I totally forgot to think about the existence of the natural logarithm as it is only assured for $sin(x),cos(x)>0$.
$endgroup$
– mrtaurho
Mar 13 at 18:04
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
@PeterParada I'm not sure what is Wolfram doing. It draw you a whole line for $f(x) =e^ln x$ which is absurd to me.
$endgroup$
– Maria Mazur
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
Thank you. I will write them for further clarification.
$endgroup$
– Peter Parada
Mar 13 at 18:07
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
$begingroup$
@PeterParada: I think Wolfram implicitly assumes that $x$ is in the domain; you might need to check documentation to see if this is standard.
$endgroup$
– Clayton
Mar 13 at 18:08
add a comment |
$begingroup$
Note that :
$$e^2ln sin x + e^2 ln cos x = 1 Rightarrow e^ln (sin x)^2 + e^ln (cos x)^2 = 1 Leftrightarrow sin^2x + cos^2x = 1 rightarrow texttrue ; forall x in mathbb R$$
Restrictions apply so as the initial expression holds, so that narrows down the solution set. Note the usage of $Rightarrow$ instead of an $Leftrightarrow$ at the start.
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
$endgroup$
add a comment |
$begingroup$
Note that :
$$e^2ln sin x + e^2 ln cos x = 1 Rightarrow e^ln (sin x)^2 + e^ln (cos x)^2 = 1 Leftrightarrow sin^2x + cos^2x = 1 rightarrow texttrue ; forall x in mathbb R$$
Restrictions apply so as the initial expression holds, so that narrows down the solution set. Note the usage of $Rightarrow$ instead of an $Leftrightarrow$ at the start.
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
$endgroup$
add a comment |
$begingroup$
Note that :
$$e^2ln sin x + e^2 ln cos x = 1 Rightarrow e^ln (sin x)^2 + e^ln (cos x)^2 = 1 Leftrightarrow sin^2x + cos^2x = 1 rightarrow texttrue ; forall x in mathbb R$$
Restrictions apply so as the initial expression holds, so that narrows down the solution set. Note the usage of $Rightarrow$ instead of an $Leftrightarrow$ at the start.
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
$endgroup$
Note that :
$$e^2ln sin x + e^2 ln cos x = 1 Rightarrow e^ln (sin x)^2 + e^ln (cos x)^2 = 1 Leftrightarrow sin^2x + cos^2x = 1 rightarrow texttrue ; forall x in mathbb R$$
Restrictions apply so as the initial expression holds, so that narrows down the solution set. Note the usage of $Rightarrow$ instead of an $Leftrightarrow$ at the start.
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
edited Mar 13 at 18:04
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
answered Mar 13 at 17:58
RebellosRebellos
15.4k31250
15.4k31250
add a comment |
add a comment |
Peter Parada is a new contributor. Be nice, and check out our Code of Conduct.
Peter Parada is a new contributor. Be nice, and check out our Code of Conduct.
Peter Parada is a new contributor. Be nice, and check out our Code of Conduct.
Peter Parada is a new contributor. Be nice, and check out our Code of Conduct.
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$begingroup$
What exactly do you mean by $ln*sin(x)$? Does it refer to $ln(sin(x))$ or what is the meaning of this notation?
$endgroup$
– mrtaurho
Mar 13 at 17:52
$begingroup$
sorry, my bad. Yes. Will fix equation
$endgroup$
– Peter Parada
Mar 13 at 17:53