25 xt-4
5410x + 5
solve it
Answers
An exponent on index is a number written to the right and the little above the base. It indicates the number of times the base occurs in the product.
For e.g
X² it is read as X squared or X raised to the power 2 or X to the power 2.
Here X is the base & 2 is the exponent or index.
· If p/q is a rational number and m is a positive integer then (p/q)^m = p^m/q^m
· If x be any rational number and m, n be any integers then x^m × x^n= x^m+n
· If x be any non zero rational number and m,n be any positive integers such that m>n ,then x^m ÷ x^n= x^m-n
· If x be any non zero rational number and m,n be any positive integers such that m<n ,then x^m ÷ x^n= 1/ x^n-m
· If x be any non zero rational number then x^0= 1
· If x be any non zero rational number then x-¹= 1/x
· If x be any non zero rational number & m be any positive Integer then x^-m=1/x^m
· If x be any non zero rational number & m,n be any positive Integer then( x^m)^n= x^mn.
· If x be any non zero rational number & m be any positive Integer then x^m × y^ m=(XY)^m
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Solution is in the attachment
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Hope this will help you....
An exponent on index is a number written to the right and the little above the base. It indicates the number of times the base occurs in the product.
For e.g
X² it is read as X squared or X raised to the power 2 or X to the power 2.
Here X is the base & 2 is the exponent or index.
· If p/q is a rational number and m is a positive integer then (p/q)^m = p^m/q^m
· If x be any rational number and m, n be any integers then x^m × x^n= x^m+n
· If x be any non zero rational number and m,n be any positive integers such that m>n ,then x^m ÷ x^n= x^m-n
· If x be any non zero rational number and m,n be any positive integers such that m<n ,then x^m ÷ x^n= 1/ x^n-m
· If x be any non zero rational number then x^0= 1
· If x be any non zero rational number then x-¹= 1/x
· If x be any non zero rational number & m be any positive Integer then x^-m=1/x^m
· If x be any non zero rational number & m,n be any positive Integer then( x^m)^n= x^mn.
· If x be any non zero rational number & m be any positive Integer then x^m × y^ m=(XY)^m
