A local community has two newspapers: the morning tomes and the evening dispatch. The morning times is read by 45% of the households.  The Evening Dispatch is read by 60% of the households.  Twenty percent of the households read both papers.  What is the probability that a particular household reads at least one paper?

In a group of 500 people, 350 people can speak English, and 400 people can speak French. Find how many people can speak both languages.

If A = { 1, 2, 3, 4, 5, 6}, B = { 2, 4, 6, 8 }. Find (A – B) ⋃ (B – A).

There are 30 students in a class. 15 study woodwork and 13 study metal work. 6 study neither of the 2 subjects. How many student study woodwork but not metal work?

a. M = {n: 2n - 3 ≤ 37} Where n is a counting number. i). write down all the elements in M.
ii.  If a number is selected at random from M what is the probability that it is a:
(α) multiple of 3;
(β) factor of 10.

b. A shop owner gave an end-of-year bonus to two of his attendees, Kontor and Gapson in the ratio of their ages. Gapson's age is one and a half times that of Kontor who is 20 years old. if Kontor received Le 200,000.00, find: i). Find the total amount shared.

ii.  Find Gapson's share.