Vector Calculus
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SCALAR CALCULUS
…Since scalars are just numbers (integers), it follows ordinary algebraic identities…
Let us consider A and B be two scalar quantities,
- Addition of two scalars will result in a scalar $$C=A+B$$
- Subtraction of two scalars will result in a scalar $$C=A-B$$
- Multiplication of two scalars will result in a scalar $$C=A×B$$
- Division of two scalars will result in a scalar $$C=A/B$$
Scalar Algebra:
Scalar Addition:
Since Scalar is just a number, Scalar addition is equivalent to simple addition of two numbers.
Let us consider A, B and C be scalar quantities,
- Scalar Addition is commutative $$A+B=B+A$$
- Scalar Addition is associative $$A+(B+C)=(A+B)+C$$
- Scalar Addition is distributive $$C(A+B)=CA+CB$$
Scalar Subtraction:
Scalar subtraction is equivalent to simple subtraction of two numbers.
- Scalar Subtraction is anti-commutative $$A-B=-(B-A)$$
- Scalar Subtraction is associative $$A-(B-C)=(A-B)-C$$
- Scalar Subtraction is distributive $$C(A-B)=CA-CB$$
Scalar Multiplication:
Scalar multiplication is equivalent to simple multiplication of two numbers.
- Scalar Multiplication is commutative $$AB=BA$$
- Scalar Multiplication is associative $$A(BC)=(AB)C$$
- Scalar Multiplication is distributive $$C(A+B)=CA+CB$$