Exponents

Selina Concise Mathematics Class 9 ICSE Solutions Indices (Exponents)

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Selina Concise Mathematics Class 9 ICSE Solutions Indices (Exponents)

APlusTopper.com provides step by step solutions for Selina Concise Mathematics Class 9 ICSE Solutions Chapter 7 Indices (Exponents). You can download the Selina Concise Mathematics ICSE Solutions for Class 9 with Free PDF download option. Selina Publishers Concise Mathematics for Class 9 ICSE Solutions all questions are solved and explained by expert mathematic teachers as per ICSE board guidelines.

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Selina ICSE Solutions for Class 9 Maths Chapter 7 Indices (Exponents)

Exercise 7(A)

Solution 1:
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Solution 2:
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Solution 3:
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Solution 4:
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Solution 5:
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Solution 6:
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Solution 7:
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Solution 8:
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Solution 9:
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Solution 10:
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Exercise 7(B)

Solution 1:
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Solution 2:
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Solution 3:
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Solution 4:
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Solution 5:
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Solution 6:
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Solution 7:
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Solution 8:
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Solution 9:
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Solution 10:
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Solution 11:
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Solution 12:
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Solution 13:
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Solution 14(i):
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Solution 14(ii):
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Solution 14(iii):
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Solution 14(iv):
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Solution 14(v):
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Exercise 7(C)

Solution 1:
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Solution 2:
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Solution 3:
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Solution 4:
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Solution 5:
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Solution 6:
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Solution 7:
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Solution 8:
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Solution 9:
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Solution 10:
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Solution 11:
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Solution 12:
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What is an Exponent?

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What is an Exponent?

Exponents

The repeated addition of numbers can be written in short form (product form).
What is an Exponent 1Examples:
What is an Exponent 2
Also, we can write the repeated multiplication of numbers in a short form known as exponential form.
For example, when 5 is multiplied by itself for two times, we write the product 5 × 5 in exponential form as 52 which is read as 5 raised to the power two.

Similarly, if we multiply 5 by itself for 6 times, the product 5 × 5 × 5 × 5 × 5 × 5 is written in exponential form as 56 which is read as 5 raised to the power 6.
In 56, the number 5 is called the base of 56 and 6 is called the exponent of the base.

In general, we write,
An exponential number as ba, where b is the base and a is the exponent.
The notation of writing the multiplication of a number by itself several times is called the exponential notation or power notation.

Thus, in general we find that :
If ‘a’ is a rational number then ‘n’ times the product of ‘a’ by itself is given as a × a × a × a ….. , n times and is denoted by an, where ‘a’ is called the base and n is called the exponent of an.

Read More:

Examples

1. Write the following statements as repeated multiplication and complete the table:

S.No.StatementsRepeated MultiplicationShort form
(i)3 multiplied by 3 for 6 times3 × 3 × 3 × 3 × 3 × 3 = 72936
(ii)2 multiplied by 2 for 3 times2 × 2 × 223
(iii)1 multiplied by 1 for 7 times1 × 1 × 1 × 1 ×  1 × 1 × 117

2. Write the base and exponent of following numbers. And also write in expanded form:

S.No.NumbersBaseExponentExpanded FormValue
(i)34343 × 3 × 3 × 381
(ii)25252 × 2 × 2 × 2 × 232
(iii)33333 × 3 × 327
(iv)22222 × 24
(v)17171 × 1 × 1 × 1 × 1 × 1 × 11

Exponents of Negative Integers

When the exponent of a negative integer is odd, the resultant is a negative number, and when the power of a negative number is even, the resultant is  a positive number.When the exponent of a negative integer is odd, the resultant is a negative number, and when the power of a negative number is even, the resultant is  a positive number.
or (a negative integer) an odd number = a negative integer.
(a negative integer) an even number  = a positive integer.

Examples:

Ex.1 Express 144 in the powers of prime factors.
Solution:
144 = 16 × 9 = 2 × 2 × 2 × 2 × 3 × 3
Here 2 is multiplied four times and 3 is multiplied 2 times to get 144.
∴  144 = 24 × 32

Ex.2 Which one is greater : 35 or 53 ?
Solution:
35 = 3 × 3 × 3 × 3 × 3 = 9 × 9 × 3
= 81 × 3 = 243
and 53 = 5 × 5 × 5 = 25 × 5 = 125
Clearly, 243 > 125
∴  35 > 53

Maths