exponents and idinties with their example
Answers
Answered by
20
Step-by-step explanation:
Useful exponent identities
Power of a power. Rule: (bx)y=bxy. Example: (b2)4=(b⋅b)⋅(b⋅b)⋅(b⋅b)⋅(b⋅b)=b8.
Multiplying exponents. Rule: (bx)⋅(by)=bx+y. Example: (b2)⋅(b3)=(b⋅b)⋅(b⋅b⋅b)=b5.
Dividing exponents. Rule: bxby=bx−y. Example: ...
Taking the power of two multiplied terms. Rule: (a⋅b)x=(ax)⋅(bx) Example:
Answered by
2
- Useful exponent identities
- Power of a power. Rule: (bx)y=bxy. Example: (b2)4=(b⋅b)⋅(b⋅b)⋅(b⋅b)⋅(b⋅b)=b8.
- Multiplying exponents. Rule: (bx)⋅(by)=bx+y. Example: (b2)⋅(b3)=(b⋅b)⋅(b⋅b⋅b)=b5.
- Dividing exponents. Rule: bxby=bx−y. Example: ...
- Taking the power of two multiplied terms. Rule: (a⋅b)x=(ax)⋅(bx) Example:
Similar questions