Ketone `(R_(1)COR_(2)),R_(1)=R_(2)` = alkyl group, can be obtained in one step by

Ketones (R_(1)COR_(2)):R_(1)=R_(2) =alkyl group, can be obtained in one step by

Ketones (R-overset(O)overset("||")C-R') can be obtained in one step by (where R and R' are alkyl groups)

The conbined resistance R of two resistors R,& R_(2)(R_(1),R_(2) gt 0) is given by . (1)/(R)=(1)/(R_(1)) +(1)/(R_(2)). If R_(1)+R_(2)= constant Prove that the maximum resistance R is obtained by choosing R_(1)=R_(2)

Two concentric spherical shells have masses m_(1) , m_(2) and radit R_(1) , R_(2) (R_(1) lt R_(2)) . Calculate the force by this system on a particle of mass m , if it is placed at a distance ((R_(1) + R_(2)))/(2) from the centre.

Two resistors of resistance R_(1) and R_(2) having R_(1) gt R_(2) are connected in parallel. For equivalent resistance R, the correct statement is

Two resistors of resistance R_(1) and R_(2) having R_(1) gt R_(2) are connected in parallel. For equivalent resistance R, the correct statement is

If in a triangle, (1-(r_(1))/(r_(2))) (1 - (r_(1))/(r_(3))) = 2 , then the triangle is

Two concentric, thin metallic spheres of radii R_(1) and R_(2) (R_(1) gt R_(2)) charges Q_(1) and Q_(2) respectively Then the potential at radius r between R_(1) and R_(2) will be (k = 1//4pi in)

Two planets of radii R_(1) and R_(2 have masses m_(1) and M_(2) such that (M_(1))/(M_(2))=(1)/(g) . The weight of an object on these planets is w_(1) and w_(2) such that (w_(1))/(w_(2))=(4)/(9) . The ratio R_(1)/R_(2)

Two concentric uniformly charge spherical shells of radius R_(1) and R_(2) (R_(2) gt R_(1)) have total charges Q_(1) and Q_(2) respectively. Derive an expression of electric field as a function of r for following positions. (i) r lt R_(1) (ii) R_(1) le r lt R_(2) (iii) r ge R_(2)