Home
Class 11
PHYSICS
Assertion : If x and y are the distances...

Assertion : If x and y are the distances also and y axes respectively then the dimension `(d^(3)y)/(dx^(3))` is `[M^(0)L^(-2)T^(0)]`
Reason : Dimensions of ` int_(a)^(b) y dx ` is `[M^(0) L^(-2)T^(0)]`

A

If both Assertion & Reason are True & 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.

Text Solution

Verified by Experts

Promotional Banner

Topper's Solved these Questions

  • PHYSICAL WORLD, UNITS AND DIMENSIONS & ERRORS IN MEASUREMENT

    ALLEN|Exercise EXERCISE-III|20 Videos

  • MISCELLANEOUS

    ALLEN|Exercise SUBJECTIVE QUESTION|9 Videos

  • SEMICONDUCTORS

    ALLEN|Exercise Part-3(Exercise-4)|51 Videos

Similar Questions

Explore conceptually related problems

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 int_(a)^(b) ydx is M^(0)L^(2)T^(@)

int_(0)^(a) y^(2) dx

Find (d^(2)y)/(dx^(2)) ,if y^(3)+3ax^(2)+x^(3)=0

int_(0)^(1)y dx where x=cos2y

The physical quanitity the dimensions [M^(-2)L^(-3)T^(0)A^(2)] is

If l and m are the degree and the order of the differential equation ((d^(2)y)/(dx^(2)))^(3/2)-((dy)/(dx))^((1)/(2))-4=0 Then 21+3m=

If x=log t , t gt 0 and y=1/t , then (d^(2)y)/(dx^(2)) , is

what is the degree of the differential equation (d^(3)y)/(dx^(3) +2 ((d^(2)y)/(dx^(2)))^(2) - (dy)/(dx) =y=0 ?

Find the order of the differential equation (d^(3)y)/(dx^(3)) + 2((d^(2)y)/(dx^(2)))^(2) + (dy)/(dx) + y = 0

If E and G respectively denote energy and gravitational constant,then (E)/(G) has the dimensions of: (1) [M^(2)][L^(-2)][T^(-1)] (2) [M^(2)][L^(-1)][T^(0)] (3) [M][L^(-1)][T^(0)] (4) [M][L^(0)][T^(0)]