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Solving $frac(sqrtx - sqrta)^2a x cdot logleft(x + a + nright) = psi$ for $x$
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Consider the following equation in $mathbbR$:
$$fracleft(sqrtx - sqrtaright)^2ax cdot logleft(x + a + nright) = psi$$
for $x$, $a$, $n$ and $psi$ strictly positive, and where $log$ is the natural logarithm.
Is there a name for this type of equation? And would there be a way to solve it for $x$?
logarithms roots
edited Jul 21 at 0:10
amWhy
189k25219431
asked Jul 20 at 23:46
Vincent
613619
add a comment |Â
up vote
0
down vote
favorite
Consider the following equation in $mathbbR$:
$$fracleft(sqrtx - sqrtaright)^2ax cdot logleft(x + a + nright) = psi$$
for $x$, $a$, $n$ and $psi$ strictly positive, and where $log$ is the natural logarithm.
Is there a name for this type of equation? And would there be a way to solve it for $x$?
logarithms roots
edited Jul 21 at 0:10
amWhy
189k25219431
asked Jul 20 at 23:46
Vincent
613619
2
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
1
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20
add a comment |Â
up vote
0
down vote
favorite
up vote
0
down vote
favorite
Consider the following equation in $mathbbR$:
$$fracleft(sqrtx - sqrtaright)^2ax cdot logleft(x + a + nright) = psi$$
for $x$, $a$, $n$ and $psi$ strictly positive, and where $log$ is the natural logarithm.
Is there a name for this type of equation? And would there be a way to solve it for $x$?
logarithms roots
edited Jul 21 at 0:10
amWhy
189k25219431
asked Jul 20 at 23:46
Vincent
613619
Consider the following equation in $mathbbR$:
$$fracleft(sqrtx - sqrtaright)^2ax cdot logleft(x + a + nright) = psi$$
for $x$, $a$, $n$ and $psi$ strictly positive, and where $log$ is the natural logarithm.
Is there a name for this type of equation? And would there be a way to solve it for $x$?
logarithms roots
edited Jul 21 at 0:10
amWhy
189k25219431
asked Jul 20 at 23:46
Vincent
613619
edited Jul 21 at 0:10
amWhy
189k25219431
edited Jul 21 at 0:10
amWhy
189k25219431
edited Jul 21 at 0:10
amWhy
189k25219431
189k25219431
asked Jul 20 at 23:46
Vincent
613619
asked Jul 20 at 23:46
Vincent
613619
asked Jul 20 at 23:46
Vincent
613619
613619
2
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
1
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20
add a comment |Â
2
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
1
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20
2
2
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
1
1
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20
add a comment |Â
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2
I'm quite sure this will require numerical methods. Perhaps it can be solved somehow with Lambert's $W$ function. It might help if you edit the question to tell us where the equation comes from.
– Ethan Bolker
Jul 21 at 0:13
1
Lambert W function doesn’t help. Just tried.
– Szeto
Jul 21 at 0:20