Is this relationship directly proportional?

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bonbon22
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Homework Statement
If i had an equation y=3x^(2/3) would this relationship be directly proportional? as y/x^(2/3) = 3 so the gradient is constant

if thats the case would y =3x^2 be directly proportional also ??
Relevant Equations
no equations
I was confused by the question below

http://www.antonine-education.co.uk/Pages/Physics_4/Tests/Test%20on%20Fields.pdf
if you look at question at question 1 section B same reasoning is used to answer this question as you can see the graph is a straight line??
but plotting r against T ^2/3 or any two variables shouldn't give you a straight line?
 
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fresh_42 said:
If you introduce a new variable ##u=x^{\frac{2}{3}}## then ##y \sim u## is directly proportional, but this is not the case for ##y## and ##x##. The same is true for ##y \sim x^2##.

In the first case we have ##y^3=3x^2## so ##y^3## and ##x^2## are directly proportional.

if you check out the link , the graph does not seem to add a new variable yet the line is directly proportional.
also does directly proportional not mean the graph has to be straight line going throuugh the origin so y^3 = 3x^2 on a graphing calculator online is not a straight line?
 
bonbon22 said:
if you check out the link , the graph does not seem to add a new variable yet the line is directly proportional.
A line can't be "directly proportional." When you have two quantities A and B that are proportional, it means that their ratio is constant. IOW, that ##\frac A B = k##, where k is a constant. Another way to say this is that A = Bk.
bonbon22 said:
also does directly proportional not mean the graph has to be straight line going throuugh the origin so y^3 = 3x^2 on a graphing calculator online is not a straight line?
They are not saying that y is proportional to x. The equation you wrote is equivalent to ##y = 3^{1/3}x^{2/3}##. This means that y is proportional to ##x^{2/3} = \sqrt[3]{x^2}##. Here the constant of proportionality is ##\sqrt[3] 3##.
 
Mark44 said:
A line can't be "directly proportional." When you have two quantities A and B that are proportional, it means that their ratio is constant. IOW, that ##\frac A B = k##, where k is a constant. Another way to say this is that A = Bk.
They are not saying that y is proportional to x. The equation you wrote is equivalent to ##y = 3^{1/3}x^{2/3}##. This means that y is proportional to ##x^{2/3} = \sqrt[3]{x^2}##. Here the constant of proportionality is ##\sqrt[3] 3##.
i see now cheers m8
 
Mark44 said:
A line can't be "directly proportional." When you have two quantities A and B that are proportional, it means that their ratio is constant. IOW, that ##\frac A B = k##, where k is a constant. Another way to say this is that A = Bk.
They are not saying that y is proportional to x. The equation you wrote is equivalent to ##y = 3^{1/3}x^{2/3}##. This means that y is proportional to ##x^{2/3} = \sqrt[3]{x^2}##. Here the constant of proportionality is ##\sqrt[3] 3##.
one question m8 my equation was y = 3x^(2/3) is this the same as y= 3 * 3 sqaure root ( x^2) ??
how come you cube rooted the 3 also ??
 
bonbon22 said:
one question m8 my equation was y = 3x^(2/3) is this the same as y= 3 * 3 sqaure root ( x^2) ??
how come you cube rooted the 3 also ??
##a^{\frac{1}{n}} = \sqrt[n]{a}##. Just take this to the power of ##n## to see it is the same. Thus ##3\sqrt[3]{x^2}=3\sqrt[3]{x}^2 =3x^{\frac{2}{3}}##.
 
fresh_42 said:
##a^{\frac{1}{n}} = \sqrt[n]{a}##. Just take this to the power of ##n## to see it is the same. Thus ##3\sqrt[3]{x^2}=3\sqrt[3]{x}^2 =3x^{\frac{2}{3}}##.
mark 44 said that that equation 3x^(2/3) is the same as 3 root (3) * 3root ( x^2)
bit confused on that . thanks for the reply tho.
 
bonbon22 said:
mark 44 said that that equation 3x^(2/3) is the same as 3 root (3) * 3root ( x^2)
bit confused on that . thanks for the reply tho.
He wrote
Mark44 said:
A line can't be "directly proportional." When you have two quantities A and B that are proportional, it means that their ratio is constant. IOW, that ##\frac A B = k##, where k is a constant. Another way to say this is that A = Bk.
They are not saying that y is proportional to x. The equation you wrote is equivalent to ##y = 3^{1/3}x^{2/3}##. This means that y is proportional to ##x^{2/3} = \sqrt[3]{x^2}##. Here the constant of proportionality is ##\sqrt[3] 3##.
which means the constant here wasn't three - sorry, but your inline formulas are hard to decode - but ##3^{\frac{1}{3}}= \sqrt[3]{3}## which is a special case of what I wrote with ##a=n=3##. Hence ##y=\sqrt[3]{3}x^{\frac{2}{3}} \sim x^{\frac{2}{3}}## with proportionality factor ##3^{\frac{1}{3}}##.