Tspirit
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I can't understand the solution to Problem 1.4(a). The solution is the following:
What puzzles me is that ρ(θ)dθ=ρ(x)dx ? Why are they equal?
Tspirit said:[
What puzzles me is that ρ(θ)dθ=ρ(x)dx ? Why are they equal?
Yes, and it must be a one-to-one-mapping (more precisely a diffeomorphism).PeroK said:What he means is that if you take a small interval (a physical interval), then there is a definite probability that the needle lies in that interval, independent of coordinates.
If you express this probability in polar coordinates you get ##\rho (\theta) d\theta## and if you express this probability in cartesian coordinates you get ##\rho (x) dx## and, therefore, they must be equal.
What you must be careful of is that when you set up your problem, ##d \theta## and ##dx## do indeed cover the same physical interval.
It helps me to think of it this way (similar to PeroK's reply). The only way for the shadow to be between x and x + dx is for the pointer to be between the corresponding θ and θ + dθ as shown below (and vice versa). So, the probability that the shadow is between x and x + dx equals the probability that the pointer is between the corresponding values θ and θ + dθ. The values of dθ and dx that correspond to each other are given by dx = -r sinθ dθTspirit said:What puzzles me is that ρ(θ)dθ=ρ(x)dx ? Why are they equal?
Tspirit said:View attachment 106575
I can't understand the solution to Problem 1.4(a). The solution is the following:
View attachment 106576
What puzzles me is that ρ(θ)dθ=ρ(x)dx ? Why are they equal?
This explanation really helps me understanding the physical meaning of that, thank a lot!TSny said:It helps me to think of it this way (similar to PeroK's reply). The only way for the shadow to be between x and x + dx is for the pointer to be between the corresponding θ and θ + dθ as shown below (and vice versa). So, the probability that the shadow is between x and x + dx equals the probability that the pointer is between the corresponding values θ and θ + dθ. The values of dθ and dx that correspond to each other are given by dx = -r sinθ dθ
View attachment 106579