Answers for exponents
Introduction :
Exponentiation is a numerical operation, written as xn, connecting two numbers, the base x and the exponent n. while n is a positive integer, exponentiation match to recurring multiplication; in other words, a invention of n factors of x. The exponent is generally exposed as a superscript to the right of the base. The exponentiation xn can be understood as: x increase to the n-th power, a increase to the power of n.
Properties to answers for exponents:
The following properties are placed in the answers for exponents. These properties are very useful to solve problems in the answers for exponents.
Examples problems to answers for Exponents:
Example problem 1 to answers for exponents:
Solve: (a5)(a3)
Solution:
Conditions of what those exponents signify. "To the 5th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
(a5)(a3) = (aaaaa) (aaa)
= aaaaaaaa
= a8
Example problem 2 to answers for exponents:
Solve: x4 x5
Solution:
Conditions of what those exponents signify. "To the 5th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
(x4)(x5) = (xxxx)(xxxxx)
= xxxxxxxxx
= x9
Example problem 3 to answers for exponents:
Solve: ab4/a3
Solution:
Conditions of what those exponents signify. "To the 4th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
ab4 / a2= b4 a1-3
= b4/a2
Example problem 4 to answers for exponents:
Shorten the following Zero exponents using the quotient rule:
74/ 74
Solution:
Given 74/ 74
= 74×7-4
= 70
= 1
Practice Problem to answers for components:
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Exponentiation is a numerical operation, written as xn, connecting two numbers, the base x and the exponent n. while n is a positive integer, exponentiation match to recurring multiplication; in other words, a invention of n factors of x. The exponent is generally exposed as a superscript to the right of the base. The exponentiation xn can be understood as: x increase to the n-th power, a increase to the power of n.
Properties to answers for exponents:
The following properties are placed in the answers for exponents. These properties are very useful to solve problems in the answers for exponents.
- The most significant characteristics fulfilled by integer exponentiation is
- This characteristics has the result
- for x ≠ 0, and
- Another basic identity is (x. y)n = xn . yn
Examples problems to answers for Exponents:
Example problem 1 to answers for exponents:
Solve: (a5)(a3)
Solution:
Conditions of what those exponents signify. "To the 5th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
(a5)(a3) = (aaaaa) (aaa)
= aaaaaaaa
= a8
Example problem 2 to answers for exponents:
Solve: x4 x5
Solution:
Conditions of what those exponents signify. "To the 5th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
(x4)(x5) = (xxxx)(xxxxx)
= xxxxxxxxx
= x9
Example problem 3 to answers for exponents:
Solve: ab4/a3
Solution:
Conditions of what those exponents signify. "To the 4th" describes multiplying five reproductions and "to the 3rd" describes multiplying three reproductions. By the simplification procedure the factors are then multiplied. It is of the appearance
ab4 / a2= b4 a1-3
= b4/a2
Example problem 4 to answers for exponents:
Shorten the following Zero exponents using the quotient rule:
74/ 74
Solution:
Given 74/ 74
= 74×7-4
= 70
= 1
Practice Problem to answers for components:
- Solve : (a3) ( ab3)
- Solve :(xy3z3) (xy) (x2 y z3)
- Simplify: (y2)3
- Solve: ( x . y) 8
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