Five distinct positive integers are in arithmetic progressions with a positive common difference. If their sum is 10020, then find the smaller possible value of the last term.

The angles of a quadrilateral are in arithmetic progression and their common difference is 10^(@) . Find the angles.

If the sum of 'n' terms of an arithmetic progression is S_(n)=3n +2n^(2) then its common difference is :

An infinite G.P has a positive common ratio and third term =8. The smallest possible value of its sum is

The sum of first n terms of an arithmetic progression is 270. If common difference of the arithmetic progression is 2 and the first term is an integer, then number of possible values of n gt 2 is

The sides of a triangle are distinct positive integers in an arithmetic progression.If the smallest side is 10, the number of such triangles is

Average score of 52 students of a class is 85. If top five scorer are excluded then the average is decreased by 2. If all five scorer are distinct integer and none of them is less than 80. 4 scorer out of 5 form a arithmetic progression having common difference 2. Find the maximum possible score of the topper.

If the sum of the first n terms of an arithmetic progression, whose first term is the sum of the first n positive integers and whose common difference is n, is (8n^(2)-11n-20) , then the sum of all the possible values of n is

The sum of the first 20 terms of an arithmetic progression whose first term is 5 and common difference is 4, is __________.

The sum of the first n terms (n>1) of an AP is 153 and the common difference is 2. If the first term is an integer,then what is the number of possible values of n.