The Power of Exponents Trivia Quiz

Answer: $1500

A way to solve this exponential equation is by getting all of the bases to be the same. The number "2" is can be a common base if you change the 8 to a 2^3.

2^(x+4) = 2^3^(3x)

You can multiply the exponents on the right side of the equation:

2^(x+4) = 2^(9x)

Since the bases on both side of the equation are now the same, you can just set the exponents equal to each other:

x+4 = 9x

With a bit of simple algebra, you will find that x = .5
If you multiply the initial deposit of $1000 by .5 you have the interest earned, which is $500. Adding that to the initial amount will give you Gregory's total amount of $1500.

Answer: Ariel

This is quite a tricky question that requires the use of logic more so than actual calculations. For the infinite power tower, if you remove the bottom x, it wouldn't change the equation at all because the x's in the power tower continue forever; it would still be the same. If you remove the bottom x the equation would be:

x^x^x^x^... = 2

It's still the same. Therefore, you can say that the exponents of the infinite power tower also equal 2. If you replace the exponents with two, the equation would become:

x^2 = 2

If you take the square root of both sides you can find in exponential form that x = 2^(1/2)

Ariel is the student that had the same answer, so she wins first place.

Answer: 6

The x's on the bottom of the fraction can be moved to the top of the fraction by making their exponent negative. There's a property that explains this:

1/(a^b) = a^-b

So, the fraction then becomes:

(x^-1)*(x^3)*(x^-6)*(x^10)

Since all the bases are the same and are being multiplied together, you can just add the exponents up to simplify it.

x^(-1+3-6+10)

Which equals x^6. The exponent is 6, so Jennifer's place also is 6.

Answer: No

In order to get the coefficients of the different variables in the expression, just set all the variables to 1.

(1^2 + 1^2 + 1^2 + 1^2 + 1^2 + 1^2 + 1^2 + 1^2)^2

This simply equals 8^2, which is 64. That number divided by 16 is 4. So, William's HPA is 4. Therefore, he does not qualify for the college.

Answer: 6

Generally, 0^0 is thought of as either 1 or undefined depending on which arguments you take. For 0^0 = 1, mathematicians argue that the binomial theorem would not be valid unless 0^0 = 1. Mathematicians who believe that the expression is undefined rely on limits to prove that 0^0 is undefined.

Answer: No

If you carefully look at the expression, you should notice that everything inside the brackets is raised to the 0 power. And, anything to the 0 power is simply 1. So, no matter what number Alex rolls, the value he'll get will be 1. Therefore, he will lose every game he plays, so he should not play.

Answer: 50 cents

This problem is similar to the first one; it can be solved the same way. The equation must be manipulated so that the bases are the same. An easy base to change to would be 3.

3^(3^3x) = 3^(5x+8)

Multiply the two exponents to get:

3^(9x) = 3^(5x+8)

And then set the exponents equal to each other:

9x = 5x+8

Lastly, with simple algebra you can find that Alice has lost 2 teeth, so the mom would have to give Alice 50 cents.

Answer: IV

Since the base of the function has to be a fraction, the asymptote of the function is in the first quadrant. The higher the value of x, the smaller value of y. No matter how high x will go, y will never reach zero. In Harrison's case, he will continue to walk along the boundary into his neighbor's property, but will never cross it. Since the asymptote is following the x axis in the first quadrant, the property is in the fourth quadrant.

Answer: $10000

To solve the equation, you need to get x by itself. You can do this by taking the cubed root of both sides.

x = (100^6)^(1/3)

If you multiply the exponents together you get 100^2, which equals 10000.

You can also solve the equation by using logarithms.

Answer: 3

You should first plug in n for the first couple of terms. For n=2, the term is 9^(1/4). For n=3, it is 9^(1/8). For n=4, it is 9^(1/16). Do you notice a pattern in the exponents? Each succeeding term has its exponent divided by 2. Since all the terms are being multiplied together and have the same base, you add all of the exponents:

9^((1/4)+(1/8)+(1/16)+(1/32)+(1/64)+...)

This is an infinite geometric series. The formula used to find the sum of one is:

a/(1-r)

"a" is the first term in the series, and "r" is the ratio at which each succeeding term is multiplied by. Simply plug in the numbers to find the sum:

(1/4)/(1 - (1/2))

It comes out to be 1/2. So, the sum of all the infinite number of exponents equals 1/2. And 9 to the 1/2 power is 3. So, Jason's last locker code is 3.