Statement-I : If x and y are the distance along x and y axes respectively then the dimensions of `(d^(3)y)/(dx^(3))` is `M^(0)L^(-2) T^(@)` Statement-
Statement-I : If x and y are the distance along x and y axes respectively then the dimensions of `(d^(3)y)/(dx^(3))` is `M^(0)L^(-2) T^(@)`
Statement-II : Dimensions of `underset(a)overset(b)(int) ydx` is `M^(0)L^(2)T^(@)`
A. If both Assertion `&` Reason are True `&` the Reason is a correct explanation of the Assertion.
B. If both Assertion `&` Reason are True but Reason is not a correct explanation of the Assertion.
C. If Assertion is True but the Reason is False.
D. If both Assertion `&` Reason are false.
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`Ararr(d^(2)y)/(dx^(3))=(M^(0)L^(1)T^(0))/(M^(0)L^(3)L^(0))=M^(0)L^(-2)T^(0)`
`Rrarrintydx=M^(0)L^(2)T^(0)`
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