# Ways to Make Your Scholarship Essay Stand Out

How to make your schoolarship essay stand out? Here are our answer
A possibility easy to separate your scholarship application from the crowd. After all, even if you match the criteria to a “T, ” you’re still likely to be one of numerous applicants.

Which where a great application essay comes in. The essay is your greatest chance to make the case for why you should receive the scholarship; it helps the scholarship or grant provider learn about the person behind the application, and gives them a much more comprehensive look at your school and home life.

If you use them right, all those few paragraphs can help your application stand outâ€”and could mean the between getting a “thanks for applying” E-mail and an honor check.

Of course , putting so much emphasis on an essay may make this seem like a challenging task, especially if you don’t consider yourself a great author. By following these four tips, just about anyone can create a standout essay.

1. Know your audience: Although we’re looking at scholarship essays in general, it’s important to realize that every scholarship provider is looking for a specific student that meets unique criteria. When you get your application, look closely and any past receivers you can find.

# Math Olympiade 2014 (Part 1)

Below I show the problems the Olympics for elementary school.

1. Find a two digit number such that if it is reduced by 5 it is a multiple of 4, if it is reduced by it is a multiple of 5 and if it is reduced by 7 it is a multiple 6.

2. A certain even number has exactly seven positive factor, including 1 and the number it self. What is this number?

3. A number p yields a remainder of 3 when divided by 5, a remainder of 5 when divided by 8 and remainder of 11 when divided by 13. If p is less than 1,000, find the maximum value of p.

4. A six digits number aba,bab is formed by repeating a two digit number ab three times, e.g 525,252. If all such numbers are divisible by p, find maximum value of p.

5. A pair of positive integers a and b is such that the greatest common divisor is 5 and the least common multiple is 1,155. Find the smallest value of (a + b).

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