Subtraction of two vectors#!#Triangle law of addition

Assertion: A vector qunatity is a quantity that has both magnitude and a direction and obeys the triangle law of addition or equivalentyly the parallelogram law of addition. Reason: The magnitude of the resultant vector of two given vectors can never be less than the magnitude of any of the given vector.

Assertion : A vector quantity is a quantity that has both magnitude and a direction and obeys the triangle law of addition and equivalently the parallelogram law of addition. Reason : The magnitude of the resultant vector of two given vectors can never be less than the magnitude of any of the given vector.

Triangle Law Of Addition Of Vectors

Assertion: The difference of two vectors A and B can be treated as the sum of two vectors. Subtraction of vectors can be defined in terms of addition of vectors.

What do you understand by resultant vector ? Show that vector addition of two vectors is different from scalar addition of two scalars.

Explain subtraction of two vectors with illustration.

In the following questions a statement of assertion (A) is followed by a statement of reason ( R). A : The addition of two vectors vecP and vecQ is commutative R: By triangle law of vector addition we can prove vecP+vecQ=vecQ+vecP .

Addition OF Vector || Subtraction OF Vector || Triangle and Parallelogram Method || Magnitude and Direction OF Resultant Vector

Magnitude of addition of two vectors

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