Difference between revisions of "2018 AMC 10A Problems/Problem 14"

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==Problem==
 +
 
What is the greatest integer less than or equal to <cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}?</cmath>
 
What is the greatest integer less than or equal to <cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}?</cmath>
  
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</math>
 
</math>
  
==Solution==
+
==Solution 1==
 +
We write
 +
<cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=\frac{3^{96}}{3^{96}+2^{96}}\cdot\frac{3^{100}}{3^{96}}+\frac{2^{96}}{3^{96}+2^{96}}\cdot\frac{2^{100}}{2^{96}}=\frac{3^{96}}{3^{96}+2^{96}}\cdot 81+\frac{2^{96}}{3^{96}+2^{96}}\cdot 16.</cmath>
 +
Hence we see that our number is a weighted average of 81 and 16, extremely heavily weighted toward 81. Hence the number is ever so slightly less than 81, so the answer is <math>\boxed{\textbf{(A) }80}</math>.
  
 +
==Solution 2==
 
Let's set this value equal to <math>x</math>. We can write
 
Let's set this value equal to <math>x</math>. We can write
 
<cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=x.</cmath>
 
<cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=x.</cmath>
 
Multiplying by <math>3^{96}+2^{96}</math> on both sides, we get  
 
Multiplying by <math>3^{96}+2^{96}</math> on both sides, we get  
 
<cmath>3^{100}+2^{100}=x(3^{96}+2^{96}).</cmath>
 
<cmath>3^{100}+2^{100}=x(3^{96}+2^{96}).</cmath>
Now let's take a look at the answer choices. We notice that <math>81</math>, choice <math>B</math>, can be written as 3^4. Plugging this into out equation above, we get
+
Now let's take a look at the answer choices. We notice that <math>81</math>, choice <math>B</math>, can be written as <math>3^4</math>. Plugging this into our equation above, we get
<cmath>3^{100}+2^{100} \stackrel{?}{=} 3^4(3^{96}+2^{96}) \Rightarrow 3^{100}+2^{100} \stackrel{?}{=} 3^{100}+3^4*2^{96}.</cmath>
+
<cmath>3^{100}+2^{100} \stackrel{?}{=} 3^4(3^{96}+2^{96}) \Rightarrow 3^{100}+2^{100} \stackrel{?}{=} 3^{100}+3^4\cdot 2^{96}.</cmath>
 
The right side is larger than the left side because  
 
The right side is larger than the left side because  
<cmath>2^{100} \leq 2^{96}*3^4.</cmath>
+
<cmath>2^{100} \leq 2^{96}\cdot 3^4.</cmath>
 
This means that our original value, <math>x</math>, must be less than <math>81</math>. The only answer that is less than <math>81</math> is <math>80</math> so our answer is <math>\boxed{A}</math>.
 
This means that our original value, <math>x</math>, must be less than <math>81</math>. The only answer that is less than <math>81</math> is <math>80</math> so our answer is <math>\boxed{A}</math>.
  
 
~Nivek
 
~Nivek
  
==Solution 2==
+
==Solution 3==
 +
<cmath>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=\frac{2^{96}\left(\frac{3^{100}}{2^{96}}\right)+2^{96}\left(2^{4}\right)}{2^{96}\left(\frac{3}{2}\right)^{96}+2^{96}(1)}=\frac{\frac{3^{100}}{2^{96}}+2^{4}}{\left(\frac{3}{2}\right)^{96}+1}=\frac{\frac{3^{100}}{2^{100}}\cdot2^{4}+2^{4}}{\left(\frac{3}{2}\right)^{96}+1}=\frac{2^{4}\left(\frac{3^{100}}{2^{100}}+1\right)}{\left(\frac{3}{2}\right)^{96}+1}.</cmath>
 +
 
 +
We can ignore the 1's on the end because they won't really affect the fraction. So, the answer is very very very close but less than the new fraction.
 +
 
 +
<cmath>\frac{2^{4}\left(\frac{3^{100}}{2^{100}}+1\right)}{\left(\frac{3}{2}\right)^{96}+1}<\frac{2^{4}\left(\frac{3^{100}}{2^{100}}\right)}{\left(\frac{3}{2}\right)^{96}},</cmath>
 +
 
 +
<cmath>\frac{2^{4}\left(\frac{3^{100}}{2^{100}}\right)}{\left(\frac{3}{2}\right)^{96}}=\frac{3^{4}}{2^{4}}*2^{4}=3^{4}=81.</cmath>
 +
 
 +
So, our final answer is very close but not quite 81, and therefore the greatest integer less than the number is <math>\boxed{(A) 80}</math>
 +
 
 +
==Solution 4==
  
 
Let <math>x=3^{96}</math> and <math>y=2^{96}</math>. Then our fraction can be written as
 
Let <math>x=3^{96}</math> and <math>y=2^{96}</math>. Then our fraction can be written as
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So ,
 
So ,
 
<math>16+\frac{65x}{x+y}<16+65=81</math>.
 
<math>16+\frac{65x}{x+y}<16+65=81</math>.
And our only answer choice less than 81 is <math>\boxed{(A)}</math>
+
And our only answer choice less than 81 is <math>\boxed{(A) 80}</math> (RegularHexagon)
 +
 
 +
==Solution 5==
 +
Let <math>x=\frac{3^{100}+2^{100}}{3^{96}+2^{96}}</math>. Multiply both sides by <math>(3^{96}+2^{96})</math>, and expand. Rearranging the terms, we get <math>3^{96}(3^4-x)+2^{96}(2^4-x)=0</math>. The left side is decreasing, and it is negative when <math>x=81</math>. This means that the answer must be less than <math>81</math>; therefore the answer is <math>\boxed{(A)}</math>.
 +
 
 +
==Solution 6 (eyeball it)==
 +
A faster solution. Recognize that for exponents of this size <math>3^{n}</math> will be enormously greater than <math>2^{n}</math>, so the terms involving <math>2</math> will actually have very little effect on the quotient. Now we know the answer will be very close to <math>81</math>.
 +
 
 +
Notice that the terms being added on to the top and bottom are in the ratio <math>\frac{1}{16}</math> with each other, so they must pull the ratio down from 81 very slightly. (In the same way that a new test score lower than your current cumulative grade always must pull that grade downward.) Answer: <math>\boxed{\text{\textbf{(A)}}}</math>.
 +
 
 +
==Solution 7==
 +
Notice how <math>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}</math> can be rewritten as <math>\frac{81(3^{96})+16(2^{96})}{3^{96}+2^{96}}=\frac{81(3^{96})+81(2^{96})}{3^{96}+2^{96}}-\frac{65(2^{96})}{3^{96}+2^{96}}=81-\frac{65(2^{96})}{3^{96}+2^{96}}</math>. Note that <math>\frac{65(2^{96})}{3^{96}+2^{96}}<1</math>, so the greatest integer less than or equal to  <math>\frac{3^{100}+2^{100}}{3^{96}+2^{96}}</math> is <math>80</math> or <math>\boxed{\textbf{(A)}}</math>
 +
~blitzkrieg21
 +
 
 +
==Solution 8==
 +
For positive <math>a, b, c, d</math>, if <math>\frac{a}{b}<\frac{c}{d}</math> then <math>\frac{c+a}{d+b}<\frac{c}{d}</math>. Let <math>a=2^{100}, b=2^{96}, c=3^{100}, d=3^{96}</math>. Then <math>\frac{c}{d}=3^4</math>. So answer is less than 81, which leaves only one choice, 80.
 +
* Note that the algebra here is synonymous to the explanation given in Solution 6. This is the algebraic reason to the logic of if you get a test score with a lower percentage than your average (no matter how many points/percentage of your total grade it was worth), it will pull your overall grade down.
 +
 
 +
~ ccx09
 +
 
 +
==Solution 9==
 +
Try long division, and notice putting <math>3^4=81</math> as the denominator is too big and putting <math>3^4-1=80</math> is too small. So we know that the answer is between <math>80</math> and <math>81</math>, yielding <math>80</math> as our answer.
 +
 
 +
==Solution 10 (Using the answer choices)==
 +
===Solution 10.1===
 +
 
 +
We can compare the given value to each of our answer choices. We already know that it is greater than <math>80</math> because otherwise there would have been a smaller answer, so we move onto <math>81</math>. We get:
 +
 
 +
<math>\frac{3^{100}+2^{100}}{3^{96}+2^{96}} \text{ ? } 3^4</math>
 +
 
 +
Cross multiply to get:
 +
 
 +
<math>3^{100}+2^{100} \text{ ? }3^{100}+(2^{96})(3^4)</math>
 +
 
 +
Cancel out <math>3^{100}</math> and divide by <math>2^{96}</math> to get <math>2^{4} \text{ ? }3^4</math>. We know that <math>2^4 < 3^4</math>, which means the expression is less than <math>81</math> so the answer is <math>\boxed{(A)}</math>.
 +
 
 +
===Solution 10.2===
 +
 
 +
We know this will be between 16 and 81 because <math>\frac{3^{100}}{3^{96}} = 3^4 = 81</math> and <math>\frac{2^{100}}{2^{96}} = 2^4 = 16</math>. <math>80=\boxed{(A)}</math> is the only option choice in this range.
 +
 
 +
 
 +
==Explanation for why 80 is indeed the floor==
  
~RegularHexagon
+
We need <math>3^{100}+2^{100} > 80 \cdot 3^{96} + 5 \cdot 2^{100}</math>. Since <math>3^{100} = 81\cdot 3^{96}</math>, this translates to
 +
<cmath>3^{96} > 4\cdot 2^{100} = 64\cdot 2^{96}.</cmath>
 +
We now prove that <math>(3/2)^k > k</math> for all positive integers <math>k</math>.
 +
Clearly, <math>(3/2)^2 = 2.25 > 2</math>. Assume <math>(3/2)^k > k</math> where <math>k\ge 2</math>. Then <math>\left(\frac{3}{2}\right)^{k+1} > \frac{3k}{2} = k + \frac{k}{2}</math>. But since <math>k/2 \ge 1</math>, we have that <math>(3/2)^{k+1} > k+1</math>. By induction (and <math>k=1</math> is trivial), the claim is proven.
 +
 
 +
Thus, <math>\left(\frac{3}{2}\right)^{96} > 96 > 64</math>. Writing this proof backwards and dividing both sides of the initial equation by <math>80</math> yields <math>80 < \frac{3^{100}+2^{100}}{3^{96}+2^{96}} < 81</math>.
 +
 
 +
 
 +
==Solution 11==
 +
 
 +
We know that in this problem, <math>3^{96}+2^{96}</math> times some number is equal to <math>3^{100}+2^{100}</math>. Multiplying answer <math>\boxed{\textbf{(B)}}</math> or 81 to <math>3^{96}+2^{96}</math> gives us <math>3^{100}+2^{96}\cdot3^4</math>. We know that <math>3^4\cdot2^{96}</math> is greater than <math>2^{100}</math>, so that means <math>\boxed{\textbf{(B)}}</math> or 81 is too big. That leaves us with only one solution: <math>80=\boxed{\textbf{(A) } 80}.</math>
 +
 
 +
~ Terribleteeth
 +
 
 +
==Solution 12==
 +
 
 +
Dividing by <math>2^{96}</math> in both numerator and denominator, this fraction can be rewritten as <cmath>\frac{81 \times (1.5)^{96} + 16}{(1.5)^{96} + 1}.</cmath> Notice that the <math>+1</math> and the <math>+16</math> will be so insignificant compared to a number such as <math>(1.5)^{96},</math> and that thereby the fraction will be ever so slightly less than <math>81</math>. Thereby, we see that the answer is <math>\boxed{\text{(A)} \ 80}.</math>
 +
 
 +
~ Professor-Mom [& wow there are now 12 sols to this problem :o :o :o this problem xDD]
 +
 
 +
==Solution 13 (slightly similar to Solution 7)==
 +
 
 +
If you multiply <math>(3^{96} + 2^{96})</math> by <math>(3^{4} + 2^{4})</math> (to get the exponent up to 100), you'll get <math>(3^{100} + 2^{100}) + 3^{96} \cdot 2^{4} + 2^{96} \cdot 3^{4}</math>. Thus, in the numerator, if you add and subtract by <math>3^{96} \cdot 2^{4}</math> and <math>2^{96} \cdot 3^{4}</math>, you'll get <math>\frac{(3^{4} + 2^{4})(3^{100} + 2^{100}) - 3^{96} \cdot 2^{4} - 2^{96} \cdot 3^{4}}{3^{96}+2^{96}}</math>. You can then take out out the first number to get <math>3^{4} + 2^{4} - \frac{3^{96} \cdot 2^{4} + 2^{96} \cdot 3^{4}}{3^{96}+2^{96}}</math>. This can then be written as <math>87 - \frac{16 \cdot 3^{96} + 16 \cdot 2^{96} + 75 \cdot 2^{96}}{3^{96}+2^{96}}</math>, factoring out the 16 and splitting the fraction will give you <math>87 - 16 - \frac{65 \cdot 2^{96}}{3^{96}+2^{96}}</math>, giving you <math>81 - \frac{65 \cdot 2^{96}}{3^{96}+2^{96}}</math>. While you can roughly say that <math>\frac{65 \cdot 2^{96}}{3^{96}+2^{96}} < 1</math> you can also notice that the only answer choice less than 81 is 80, thus the answer is <math>\boxed{\text{(A)} \ 80}.</math>
 +
 
 +
~ Zeeshan12 [Now there's 13 :) ]
 +
 
 +
==Solution 14 (Factoring)==
 +
If you factor out <math>3^{100}</math> from the numerator and <math>3^{96}</math> from the denominator, you will get <math>\frac{3^{100}\left(1+(\frac{2}{3}\right)^{100})}{3^{96}\left(1+(\frac{2}{3}\right)^{96})}</math>. Divide the numerator and denominator by <math>3^{96}</math> to get <math>\frac{81\left(1+(\frac{2}{3}\right)^{100})}{\left(1+(\frac{2}{3}\right)^{96})}</math>. We see that every time we multiply <math>\frac{2}{3}</math> by itself, it slightly decreases, so <math>1+(\frac{2}{3})^{100}</math> will be ever so slightly smaller than <math>1+(\frac{2}{3})^{96}</math>. Thus, the decimal representation of <math>\frac{\left(1+(\frac{2}{3}\right)^{100})}{\left(1+(\frac{2}{3}\right)^{96})}</math> will be extremely close to <math>1</math>, so our solution will be the largest integer that is less than <math>81</math>. Thus, the answer is <math>\boxed{\text{(A)} \ 80}.</math>
 +
 
 +
~andy_lee
 +
 
 +
==Video Solution (HOW TO THINK CREATIVELY!)==
 +
https://youtu.be/zb0AcwIDqdg
 +
 
 +
~Education, the Study of Everything
 +
 
 +
==See Also==
  
 
{{AMC10 box|year=2018|ab=A|num-b=13|num-a=15}}
 
{{AMC10 box|year=2018|ab=A|num-b=13|num-a=15}}
 +
{{MAA Notice}}
 +
 +
[[Category:Intermediate Number Theory Problems]]

Latest revision as of 10:59, 27 October 2023

Problem

What is the greatest integer less than or equal to \[\frac{3^{100}+2^{100}}{3^{96}+2^{96}}?\]

$\textbf{(A) }80\qquad \textbf{(B) }81 \qquad \textbf{(C) }96 \qquad \textbf{(D) }97 \qquad \textbf{(E) }625\qquad$

Solution 1

We write \[\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=\frac{3^{96}}{3^{96}+2^{96}}\cdot\frac{3^{100}}{3^{96}}+\frac{2^{96}}{3^{96}+2^{96}}\cdot\frac{2^{100}}{2^{96}}=\frac{3^{96}}{3^{96}+2^{96}}\cdot 81+\frac{2^{96}}{3^{96}+2^{96}}\cdot 16.\] Hence we see that our number is a weighted average of 81 and 16, extremely heavily weighted toward 81. Hence the number is ever so slightly less than 81, so the answer is $\boxed{\textbf{(A) }80}$.

Solution 2

Let's set this value equal to $x$. We can write \[\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=x.\] Multiplying by $3^{96}+2^{96}$ on both sides, we get \[3^{100}+2^{100}=x(3^{96}+2^{96}).\] Now let's take a look at the answer choices. We notice that $81$, choice $B$, can be written as $3^4$. Plugging this into our equation above, we get \[3^{100}+2^{100} \stackrel{?}{=} 3^4(3^{96}+2^{96}) \Rightarrow 3^{100}+2^{100} \stackrel{?}{=} 3^{100}+3^4\cdot 2^{96}.\] The right side is larger than the left side because \[2^{100} \leq 2^{96}\cdot 3^4.\] This means that our original value, $x$, must be less than $81$. The only answer that is less than $81$ is $80$ so our answer is $\boxed{A}$.

~Nivek

Solution 3

\[\frac{3^{100}+2^{100}}{3^{96}+2^{96}}=\frac{2^{96}\left(\frac{3^{100}}{2^{96}}\right)+2^{96}\left(2^{4}\right)}{2^{96}\left(\frac{3}{2}\right)^{96}+2^{96}(1)}=\frac{\frac{3^{100}}{2^{96}}+2^{4}}{\left(\frac{3}{2}\right)^{96}+1}=\frac{\frac{3^{100}}{2^{100}}\cdot2^{4}+2^{4}}{\left(\frac{3}{2}\right)^{96}+1}=\frac{2^{4}\left(\frac{3^{100}}{2^{100}}+1\right)}{\left(\frac{3}{2}\right)^{96}+1}.\]

We can ignore the 1's on the end because they won't really affect the fraction. So, the answer is very very very close but less than the new fraction.

\[\frac{2^{4}\left(\frac{3^{100}}{2^{100}}+1\right)}{\left(\frac{3}{2}\right)^{96}+1}<\frac{2^{4}\left(\frac{3^{100}}{2^{100}}\right)}{\left(\frac{3}{2}\right)^{96}},\]

\[\frac{2^{4}\left(\frac{3^{100}}{2^{100}}\right)}{\left(\frac{3}{2}\right)^{96}}=\frac{3^{4}}{2^{4}}*2^{4}=3^{4}=81.\]

So, our final answer is very close but not quite 81, and therefore the greatest integer less than the number is $\boxed{(A) 80}$

Solution 4

Let $x=3^{96}$ and $y=2^{96}$. Then our fraction can be written as $\frac{81x+16y}{x+y}=\frac{16x+16y}{x+y}+\frac{65x}{x+y}=16+\frac{65x}{x+y}$. Notice that $\frac{65x}{x+y}<\frac{65x}{x}=65$. So , $16+\frac{65x}{x+y}<16+65=81$. And our only answer choice less than 81 is $\boxed{(A) 80}$ (RegularHexagon)

Solution 5

Let $x=\frac{3^{100}+2^{100}}{3^{96}+2^{96}}$. Multiply both sides by $(3^{96}+2^{96})$, and expand. Rearranging the terms, we get $3^{96}(3^4-x)+2^{96}(2^4-x)=0$. The left side is decreasing, and it is negative when $x=81$. This means that the answer must be less than $81$; therefore the answer is $\boxed{(A)}$.

Solution 6 (eyeball it)

A faster solution. Recognize that for exponents of this size $3^{n}$ will be enormously greater than $2^{n}$, so the terms involving $2$ will actually have very little effect on the quotient. Now we know the answer will be very close to $81$.

Notice that the terms being added on to the top and bottom are in the ratio $\frac{1}{16}$ with each other, so they must pull the ratio down from 81 very slightly. (In the same way that a new test score lower than your current cumulative grade always must pull that grade downward.) Answer: $\boxed{\text{\textbf{(A)}}}$.

Solution 7

Notice how $\frac{3^{100}+2^{100}}{3^{96}+2^{96}}$ can be rewritten as $\frac{81(3^{96})+16(2^{96})}{3^{96}+2^{96}}=\frac{81(3^{96})+81(2^{96})}{3^{96}+2^{96}}-\frac{65(2^{96})}{3^{96}+2^{96}}=81-\frac{65(2^{96})}{3^{96}+2^{96}}$. Note that $\frac{65(2^{96})}{3^{96}+2^{96}}<1$, so the greatest integer less than or equal to $\frac{3^{100}+2^{100}}{3^{96}+2^{96}}$ is $80$ or $\boxed{\textbf{(A)}}$ ~blitzkrieg21

Solution 8

For positive $a, b, c, d$, if $\frac{a}{b}<\frac{c}{d}$ then $\frac{c+a}{d+b}<\frac{c}{d}$. Let $a=2^{100}, b=2^{96}, c=3^{100}, d=3^{96}$. Then $\frac{c}{d}=3^4$. So answer is less than 81, which leaves only one choice, 80.

  • Note that the algebra here is synonymous to the explanation given in Solution 6. This is the algebraic reason to the logic of if you get a test score with a lower percentage than your average (no matter how many points/percentage of your total grade it was worth), it will pull your overall grade down.

~ ccx09

Solution 9

Try long division, and notice putting $3^4=81$ as the denominator is too big and putting $3^4-1=80$ is too small. So we know that the answer is between $80$ and $81$, yielding $80$ as our answer.

Solution 10 (Using the answer choices)

Solution 10.1

We can compare the given value to each of our answer choices. We already know that it is greater than $80$ because otherwise there would have been a smaller answer, so we move onto $81$. We get:

$\frac{3^{100}+2^{100}}{3^{96}+2^{96}} \text{ ? } 3^4$

Cross multiply to get:

$3^{100}+2^{100} \text{ ? }3^{100}+(2^{96})(3^4)$

Cancel out $3^{100}$ and divide by $2^{96}$ to get $2^{4} \text{ ? }3^4$. We know that $2^4 < 3^4$, which means the expression is less than $81$ so the answer is $\boxed{(A)}$.

Solution 10.2

We know this will be between 16 and 81 because $\frac{3^{100}}{3^{96}} = 3^4 = 81$ and $\frac{2^{100}}{2^{96}} = 2^4 = 16$. $80=\boxed{(A)}$ is the only option choice in this range.


Explanation for why 80 is indeed the floor

We need $3^{100}+2^{100} > 80 \cdot 3^{96} + 5 \cdot 2^{100}$. Since $3^{100} = 81\cdot 3^{96}$, this translates to \[3^{96} > 4\cdot 2^{100} = 64\cdot 2^{96}.\] We now prove that $(3/2)^k > k$ for all positive integers $k$. Clearly, $(3/2)^2 = 2.25 > 2$. Assume $(3/2)^k > k$ where $k\ge 2$. Then $\left(\frac{3}{2}\right)^{k+1} > \frac{3k}{2} = k + \frac{k}{2}$. But since $k/2 \ge 1$, we have that $(3/2)^{k+1} > k+1$. By induction (and $k=1$ is trivial), the claim is proven.

Thus, $\left(\frac{3}{2}\right)^{96} > 96 > 64$. Writing this proof backwards and dividing both sides of the initial equation by $80$ yields $80 < \frac{3^{100}+2^{100}}{3^{96}+2^{96}} < 81$.


Solution 11

We know that in this problem, $3^{96}+2^{96}$ times some number is equal to $3^{100}+2^{100}$. Multiplying answer $\boxed{\textbf{(B)}}$ or 81 to $3^{96}+2^{96}$ gives us $3^{100}+2^{96}\cdot3^4$. We know that $3^4\cdot2^{96}$ is greater than $2^{100}$, so that means $\boxed{\textbf{(B)}}$ or 81 is too big. That leaves us with only one solution: $80=\boxed{\textbf{(A) } 80}.$

~ Terribleteeth

Solution 12

Dividing by $2^{96}$ in both numerator and denominator, this fraction can be rewritten as \[\frac{81 \times (1.5)^{96} + 16}{(1.5)^{96} + 1}.\] Notice that the $+1$ and the $+16$ will be so insignificant compared to a number such as $(1.5)^{96},$ and that thereby the fraction will be ever so slightly less than $81$. Thereby, we see that the answer is $\boxed{\text{(A)} \ 80}.$

~ Professor-Mom [& wow there are now 12 sols to this problem :o :o :o this problem xDD]

Solution 13 (slightly similar to Solution 7)

If you multiply $(3^{96} + 2^{96})$ by $(3^{4} + 2^{4})$ (to get the exponent up to 100), you'll get $(3^{100} + 2^{100}) + 3^{96} \cdot 2^{4} + 2^{96} \cdot 3^{4}$. Thus, in the numerator, if you add and subtract by $3^{96} \cdot 2^{4}$ and $2^{96} \cdot 3^{4}$, you'll get $\frac{(3^{4} + 2^{4})(3^{100} + 2^{100}) - 3^{96} \cdot 2^{4} - 2^{96} \cdot 3^{4}}{3^{96}+2^{96}}$. You can then take out out the first number to get $3^{4} + 2^{4} - \frac{3^{96} \cdot 2^{4} + 2^{96} \cdot 3^{4}}{3^{96}+2^{96}}$. This can then be written as $87 - \frac{16 \cdot 3^{96} + 16 \cdot 2^{96} + 75 \cdot 2^{96}}{3^{96}+2^{96}}$, factoring out the 16 and splitting the fraction will give you $87 - 16 - \frac{65 \cdot 2^{96}}{3^{96}+2^{96}}$, giving you $81 - \frac{65 \cdot 2^{96}}{3^{96}+2^{96}}$. While you can roughly say that $\frac{65 \cdot 2^{96}}{3^{96}+2^{96}} < 1$ you can also notice that the only answer choice less than 81 is 80, thus the answer is $\boxed{\text{(A)} \ 80}.$

~ Zeeshan12 [Now there's 13 :) ]

Solution 14 (Factoring)

If you factor out $3^{100}$ from the numerator and $3^{96}$ from the denominator, you will get $\frac{3^{100}\left(1+(\frac{2}{3}\right)^{100})}{3^{96}\left(1+(\frac{2}{3}\right)^{96})}$. Divide the numerator and denominator by $3^{96}$ to get $\frac{81\left(1+(\frac{2}{3}\right)^{100})}{\left(1+(\frac{2}{3}\right)^{96})}$. We see that every time we multiply $\frac{2}{3}$ by itself, it slightly decreases, so $1+(\frac{2}{3})^{100}$ will be ever so slightly smaller than $1+(\frac{2}{3})^{96}$. Thus, the decimal representation of $\frac{\left(1+(\frac{2}{3}\right)^{100})}{\left(1+(\frac{2}{3}\right)^{96})}$ will be extremely close to $1$, so our solution will be the largest integer that is less than $81$. Thus, the answer is $\boxed{\text{(A)} \ 80}.$

~andy_lee

Video Solution (HOW TO THINK CREATIVELY!)

https://youtu.be/zb0AcwIDqdg

~Education, the Study of Everything

See Also

2018 AMC 10A (ProblemsAnswer KeyResources)
Preceded by
Problem 13
Followed by
Problem 15
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All AMC 10 Problems and Solutions

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