📖 generic · CBSE Class 11 English medium · PHYSICS · Page 15question

In Fig. 3.18(c), ∆ t Ž 0 and the average · Part 3

Chapter 3: MOTION IN A PLANE · PHYSICS

is its magnitude ? Answer This is an example of uniform circular motion. Here R = cm. The angular speed ω is given by ω = π / T = π × / = .

rad/s The linear speed v is : v = ω R = . s - × cm = . cm s - The direction of velocity v is along the tangent to the circle at every point. The acceleration is directed towards the centre of the circle.

Since this direction changes continuously, acceleration here is not a constant vector. However, the magnitude of acceleration is constant: a = ω R = ( . s – ) ( cm) = . cm s - SUMMARY .

Scalar quantities are quantities with magnitudes only. Examples are distance, speed, mass and temperature. . Vector quantities are quantities with magnitude and direction both.

Examples are displacement, velocity and acceleration. They obey special rules of vector algebra. . A vector A multiplied by a real number λ is also a vector, whose magnitude is λ times the magnitude of the vector A and whose direction is the same or opposite depending upon whether λ is positive or negative.

. Two vectors A and B may be added graphically using head-to-tail method or parallelogram method . . Vector addition is commutative : A + B = B + A It also obeys the associative law : ( A + B ) + C = A + ( B + C ) .

A null or zero vector is a vector with zero magnitude. Since the magnitude is zero, we don’t have to specify its direction. It has the properties : A + = A λ = A = . The subtraction of vector B from A is defined as the sum of A and – B : A – B = A + ( – B ) .

A vector A can be resolved into component along two given vectors a and b lying in the same plane : A

Related topics

Have a question about this topic?

Get an AI answer grounded in your actual textbook — with the exact page reference.

Ask AI about this topic →