Homework SourseIs the product of two odd integers odd or even Give a comple
Solution
I am solving Q9 and Q10, please post one more question to get the remaining two answers. Thanks
Q9)
Let the two odd integers be a and b, then a and b can be written as
a = 2p + 1
b = 2q + 1
where p and q are integers
a * b = (2p+1) * (2q+1) = 4pq + 2p + 2q + 1 = 2(2pq+p+q) + 1
2pq + p + q, will be a new integer P, then ab = 2P + 1, hence the product of two odd numbers will always be an odd number
Hence proved
Q10)
Proof by using mathematical induction
Base Case: (n=1)
LHS = 1
RHS = 1^2 = 1
Hence the base case holds true
Let us assume that the given thing holds true for n=k
1 + 3 + 5 + ... + (2k-1) = k^2
Now we need to prove that given thing holds true for (n=k+1)
LHS = 1 + 3 + 5 + .... + (2k-1) + (2(k+1) - 1)
using the above factor that (1 + 3 + 5 + .... + (2k-1)) = k^2, we get
LHS = k^2 + 2k + 2 - 1 = k^2 + 2k + 1 = (k+1)^2
RHS = (k+1)^2
Hence by the principle of mathematical induction we get
1 + 3 + 5 + .... + (2n-1) = n^2
