Joint distribution problem. [on hold]
Clash Royale CLAN TAG#URR8PPP
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-4
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I have a problem to solve, and I have really no idea how to solve it! All help is really welcomed!
Thank you!
probability
edited Aug 27 at 1:05
Deepesh Meena
3,003822
asked Aug 26 at 23:31
Missmathematica
1
put on hold as off-topic by Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus yesterday
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please improve the question by providing additional context, which ideally includes your thoughts on the problem and any attempts you have made to solve it. This information helps others identify where you have difficulties and helps them write answers appropriate to your experience level." – Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus
add a comment |Â
up vote
-4
down vote
favorite
I have a problem to solve, and I have really no idea how to solve it! All help is really welcomed!
Thank you!
probability
edited Aug 27 at 1:05
Deepesh Meena
3,003822
asked Aug 26 at 23:31
Missmathematica
1
put on hold as off-topic by Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus yesterday
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please improve the question by providing additional context, which ideally includes your thoughts on the problem and any attempts you have made to solve it. This information helps others identify where you have difficulties and helps them write answers appropriate to your experience level." – Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus
2
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38
add a comment |Â
up vote
-4
down vote
favorite
up vote
-4
down vote
favorite
I have a problem to solve, and I have really no idea how to solve it! All help is really welcomed!
Thank you!
probability
edited Aug 27 at 1:05
Deepesh Meena
3,003822
asked Aug 26 at 23:31
Missmathematica
1
I have a problem to solve, and I have really no idea how to solve it! All help is really welcomed!
Thank you!
probability
edited Aug 27 at 1:05
Deepesh Meena
3,003822
asked Aug 26 at 23:31
Missmathematica
1
edited Aug 27 at 1:05
Deepesh Meena
3,003822
edited Aug 27 at 1:05
Deepesh Meena
3,003822
edited Aug 27 at 1:05
Deepesh Meena
3,003822
3,003822
asked Aug 26 at 23:31
Missmathematica
1
asked Aug 26 at 23:31
Missmathematica
1
asked Aug 26 at 23:31
Missmathematica
1
1
put on hold as off-topic by Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus yesterday
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please improve the question by providing additional context, which ideally includes your thoughts on the problem and any attempts you have made to solve it. This information helps others identify where you have difficulties and helps them write answers appropriate to your experience level." – Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus
put on hold as off-topic by Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus yesterday
This question appears to be off-topic. The users who voted to close gave this specific reason:
- "This question is missing context or other details: Please improve the question by providing additional context, which ideally includes your thoughts on the problem and any attempts you have made to solve it. This information helps others identify where you have difficulties and helps them write answers appropriate to your experience level." – Shaun, Siong Thye Goh, Math1000, Jendrik Stelzner, Leucippus
2
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38
add a comment |Â
2
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38
2
2
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38
add a comment |Â
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2
hi, you'll need to put the problem on here not just link to external page and also outline what you've tried so far
– Andrew Allen
Aug 26 at 23:34
I agree. Put the question here. What do you know about joint distributions? What are the properties? Let's start from there.
– BlackMath
Aug 26 at 23:41
In general $int f(x,y)dxdy=1$, when integrating over the entire domain That should get you c.
– herb steinberg
Aug 27 at 1:23
Hi, thank you for your answers. I have now used steinbergs formula and got c=3/2. Now I'm trying to determine the distributions. Should I use the formula ∫∫fXY(x,y)dxdy? What is fXY then?
– Missmathematica
Aug 28 at 15:38