Question
Two masses m1 and m2 are placed on a smooth surface horizontally and connected by a light string as shown in figure A force F is applied on mass m1, then the tension in the string T2 is.
The correct answer is:
Related Questions to study
Two masses m1 and m2 are suspended from a rigid support through a light string. The tension in the string between support and mass m1 is.
Two masses m1 and m2 are suspended from a rigid support through a light string. The tension in the string between support and mass m1 is.
If the angle of friction is 45, then the coefficient of static friction is.
If the angle of friction is 45, then the coefficient of static friction is.
A block of mass 2kg lies on a horizontal surface and it is subjected to a vertical downward force 30N as shown in figure. The contact force between the block and surface is.
A block of mass 2kg lies on a horizontal surface and it is subjected to a vertical downward force 30N as shown in figure. The contact force between the block and surface is.
The free body diagram of block 'm' is
The free body diagram of block 'm' is
If and , then all the values of lie on
Therefore the correct option is choice 4
If and , then all the values of lie on
Therefore the correct option is choice 4
If is a complex number such that then the minimum value of is is strictly
Therefore the correct option is choice 4
If is a complex number such that then the minimum value of is is strictly
Therefore the correct option is choice 4
If and then
Therefore the correct option is choice 3
If and then
Therefore the correct option is choice 3
One of the values of
One of the values of
If the distance between the points , is
then 6
Assertion (A): If , then lies between
Reason If , then
If the distance between the points , is
then 6
Assertion (A): If , then lies between
Reason If , then
If then a+b+c=
So here we have used the trigonometric functions and trigonometric formulas to solve this, the algebraic expressions were used to formulate it. Here the answer of a+b+c is 7.
If then a+b+c=
So here we have used the trigonometric functions and trigonometric formulas to solve this, the algebraic expressions were used to formulate it. Here the answer of a+b+c is 7.
If a,b,c are the sides of the triangle ABC such that
Then the triangle must be
If a,b,c are the sides of the triangle ABC such that
Then the triangle must be
If and then the value of ' is
Therefore the correct option is choice 3
If and then the value of ' is
Therefore the correct option is choice 3