Step-by-step explanation:
Let the number of beans Tom ate on thursday be [tex]a[/tex].
Let [tex]d[/tex] be the difference between the number of beans he eats on a day and its previous day.
It is given that he eats 7 more beans every day than the previous day.
So,[tex]d=7[/tex]
So the number of beans he eats is [tex]a,a+x,a+2\times x,a+3\times x ,...[/tex]
This is a arithmetic progression because the difference between any two terms in the series is constant.
There are seven days between thursday and following wednesday both inclusive.
Let [tex]n[/tex] be the number of terms in arithmetic progression.
Sum of first n terms in arithmetic progression is [tex](2\times a +(n-1)\times d)\frac{n}{2}[/tex]
Since it is given that he ate 161 in total.
[tex](2\times a +(n-1)\times d)\frac{n}{2}[/tex][tex]= 161[/tex]
substituting [tex]n=7[/tex] and [tex]d=7[/tex],
[tex](2\times a +(7-1)\times 7)\frac{7}{2}=161\\ 2\times a+42=46\\2\times a=4\\a=2[/tex]
So,he ate 2 beans on thursday.
