254 MATHEMATICS
Can you write the appropriate number in the box.
(–11)^2 × (–11)^6 = (–11)
b^2 × b^3 =b (Remember, base is same; bis any integer).
c^3 × c^4 =c (cis any integer)
d^10 × d^20 =d
From this we can generalise that for any non-zero integer a, where m
andnare whole numbers,
am × an =am + nCaution!
Consider 2^3 × 3^2
Can you add the exponents? No! Do you see ‘why’? The base of 2^3 is 2 and base
of 3^2 is 3. The bases are not same.13.3.2 Dividing Powers with the Same Base
Let us simplify 3^7 ÷ 34?37 ÷ 34 =7
43
3
=
3333333
3333
= 3 × 3 × 3 = 3^3 = 37 – 4
Thus 37 ÷ 3^4 =37 – 4
(Note, in 3^7 and 3^4 the base is same and 3^7 ÷ 34 becomes 37– 4)
Similarly,56 ÷ 5^2 =5
5555555
556
2 =×××××
×
= 5 × 5 × 5 × 5 = 5^4 = 56 – 2
or 56 ÷ 52 =56 – 2
Leta be a non-zero integer, then,a^4 ÷ a^2 =a
aaaaa
aaaa a a4
2
====^242or a^4 ÷a^2 =a4 – 2
Now can you answer quickly?
108 ÷ 10^3 =108 – 3 = 10^5
79 ÷ 7^6 =7
a^8 ÷ a^5 =aSimplify and write in
exponential form:
(i) 2^5 × 2^3
(ii) p^3 × p^2
(iii) 4^3 ×4^2
(iv) a^3 × a^2 × a^7
(v) 5^3 × 5^7 × 5^12
(vi) (– 4)^100 × (– 4)^20TRY THESE