Limits and Infinity

Find the...

Question

Limits and Infinity

Find the limits in Exercises 37–46.

x⁴ + x³

lim -----------------

x→∞ 12x³ + 128

Accepted Answer

Welcome back everyone to another video. Find the limit for the function F of X equals 3x the power of 4 minus 100 x 2 divided by 6 X to the power of 4 plus 600 as X approaches infinity. We're given 4 answer choices A says 6, B 16, C2, and D 1/2. Let's write down the given limit. We're given limit as X approaches infinity. Of 3x the power of 4 minus 100 x squad divided by 6 X the power of 4 + 600. If we attempt the direct substitution and analyze each term of the fraction. We notice that we have 3 multiplied by infinity to the power of 4, which is simply infinity. We are subtracting 100 multiplied by infinity squared, which is infinity, and then in the denominator we end up with 6 multiplied by infinity to the power of 4 + 600, which is basically infinity, and this is an indeterminate form. And usually we can get rid of this in the terminate form by considering a rational function and dividing all of our terms by X with the highest exponent in the denominator, and that's X the power of 4. So let's go ahead and do that. This gives us limit as x approaches infinity of 3 minus 100 x 2 divided by X to the power of 4. This is 100 divided by X2. And now for the denominator, we are left with 6 + 600 divided by X to the power of 4. Now let's analyze the result on fraction. If we divide a number by infinity, well, this gives us a limit of 0, right? So two of our terms are approaching 0 as X approaches infinity, and this leaves us with two whole terms, meaning the limit is 3 divided by 6, which is simply equal to 1/2. Well then, we have identified the final answer which corresponds to the answer to the 1/2. Thank you for watching.

Limits and Infinity

Find the limits in Exercises 37–46.

x⁴ + x³
lim -----------------
x→∞ 12x³ + 128

Key Concepts

Limits

Rational Functions

Dominant Terms

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