The symbolism ⌊x⌋ denotes the largest integer not exceeding x. For example, ⌊3⌋ = 3 and ⌊9/2⌋ = 4. Compute:

⌊sqrt(1)⌋ + ⌊sqrt(2)⌋ + ⌊sqrt(3)⌋ + ... ⌊sqrt(16)⌋ (AMC 10)

Hint: Try to evaluate this term by term.

Find the value of x that satisfies the equation:

25^-2 = (5^48/x)/(5^26/x * 25^17/x) (AMC 10)

Hint: Rewrite the RHS as 5ⁿ, for some number n using laws of exponents

If 2^7x * 2⁵ = 2²⁶, what is the value of x?

Find the exact value of 998² without using a calculator.

Find the sum of all solutions to the equation 3^{2x + 1} + 30(3^x) + 27 = 0. 

Hint: Does this look familiar? It kind of looks like a quadratic. How would we use quadratic techniques to solve?

Let x2 + bx + c = 0 be a quadratic equation. Which of the following conditions will guarantee that this equation has a real solution:

(A) b is negative     (B) c is negative    (C) b is positive (D) c is positive      (E) None of these guarantee this

Hint: Think about the discriminant.

How many different real numbers x satisfy the equation (x² - 5)² = 16? (AMC 8)

(Hint: Be careful with the square roots)

Come up in front of the class and sing the quadratic equation song. If you do this, you get 3 pieces of candy.

On the last day of school, Mrs. Awesome gave jelly beans to her class. She gave each boy as many jelly beans as there were boys in the class. She gave each girl as many jelly beans as there were girls in the class. She brought 400 jelly beans, and when she finished, she had six jelly beans left. There were two more boys than girls in her class. How many students were in her class? (AMC 8)

Hint: Write an equation for this.

Both roots of the quadratic equation x² − 63x + k = 0 are prime numbers. Compute the number of possible values of k. (AMC 10)

Hint: Write equations using Vieta's formula. Note that odd + odd = even and odd + even = odd, and that the roots are PRIME numbers.

How many REAL solutions does the equation x² - 7x + 15 have?

Let f(x) = sqrt(x + sqrt(x + sqrt(x ...))). How many values of k are there such that 0 <= k <= 100 and f(k) is an integer.

Hint: Let n = sqrt(x + sqrt(x + sqrt(x ...))). Can we write a quadratic equation for n?

The parabolas y = ax² - 2 and y = 4 - bx² and intersect the coordinate axes in exactly four points, and these four points are the vertices of a kite of area 12. What is a + b? (AMC 12)

Hint: Try to graph this situation. Find the y-intercepts and the roots in terms of a and b.

The expression (sqrt(sqrt(sqrt(x))) * x^-2)^-2/3 can be written as x^k. What is k?

Hint: Remember that sqrt(x) = x^1/2

Find the value of (2²⁰⁰¹ * 3²⁰⁰³)/6²⁰⁰² (AMC 10)

Hint: Can you rewrite the numerator to get a power of 6?