Math Tutor Explains: What is 71 to the Power of 73?

A math tutor would explain that to solve for 71 to the power of 73, we must first understand the structure. The number 71 is called the base, and the number 73 is called the exponent. In short, the base must be multiplied by itself the number of times as the exponent. Let’s look at this problem in more detail.

Math Tutor's Solution: 71 to the Power of 73 is equal to 1386307128730129964201125180277980651474219267439506286162133822125299395136330955721313607564549475455568752309126967750436020312210311

Methods

Step-by-step from math tutor: finding 71 to the power of 73

The first step a math tutor would suggest is to understand what it means when a number has an exponent. The “power” of a number indicates how many times the base would be multiplied by itself to reach the correct value.

The second step is to write the number in the base-exponent form, and lastly calculate what the final result would be. Consider the example of 2 to the power of 4: in exponent form that would be

242^4
. To solve this, we need to multiply the base, 2 by itself, 4 times -
22222\cdot2\cdot2\cdot2
= 16. So
24=162^4 = 16
.

So re-applying these steps to our particular problem, we first convert our word problem to a base-exponent form of:

717371^{73}

To simplify this, all that is needed is to multiply it out:

71 x 71 x 71 x 71 x ... (for a total of 73 times) = 1386307128730129964201125180277980651474219267439506286162133822125299395136330955721313607564549475455568752309126967750436020312210311

Therefore, 71 to the power of 73 is 1386307128730129964201125180277980651474219267439506286162133822125299395136330955721313607564549475455568752309126967750436020312210311.

Math Tutor Suggests: Try related exponent problems

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