Answer:
The correct option is D. The sum first 10 even numbers is 10x11.
Step-by-step explanation:
The first even number is 2 and the sum of first even term is 2. The product form of the sum is
[tex]1\times 2[/tex]
The first two even number are 2,4 and the sum of first two even terms is 6. The product form of the sum is
[tex]2\times 3[/tex]
The first three even number are 2,4,6 and the sum of first three even terms is 12. The product form of the sum is
[tex]3\times 4[/tex]
The product form of the sum of ever term follows pattern. It is the product of n and (n+1), where n is the first n even numbers.
[tex]n\times (n+1)[/tex]
The pattern can be derived.
The sum of first n even numbers is
[tex]S_n=2+4+6+8+---+2n[/tex]
[tex]S_n=2(1+2+3+4+---+n)[/tex]
[tex]S_n=2(\frac{n}{2})(2(1)+(n-1)1)[/tex]
[tex]S_n=n(2+n-1)[/tex]
[tex]S_n=n(n+1)[/tex]
Therefore the sum of first 10 even numbers is
[tex]S_{10}=10\times (10+1)[/tex]
[tex]S_{10}=10\times (11)[/tex]
Therefore option D is correct.
