Determine the value of the
positive integer constant A that satisfies this relationship:
6
∫ {y}
[y] dy = 19/20
A
Bonus Question:
What are the possible pair(s) of the
positive integer constants (B, C) that satisfy this relationship?
C
∫ [y]
{y} * ln [y] dy = 18
B
Notes:
(i) [x] is the greatest integer ≤ x, and {x}= x - [x]
(ii) ln x is the
natural logarithm of x.
There was once a man named Harold. Harold was from England. The king would always get upset with Harold because it seemed like Harold never failed at anything and the king was jealous.
So one day, the king was determined to prove Harold a failure. He drew a line across the floor. He said:
"Harold, make this line shorter. You may not erase it in any way".
Harold said
"No problem your highness".
And he made the line shorter.
How is this possible?
Latest: 
