Pythagorearn

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 #1
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We are tasked with finding the area of a regular hexagon \(IJKLMN\) where the interior angles are all equal. However, the given side lengths of the hexagon vary, suggesting that this is not a regular hexagon, but rather an **equiangular hexagon** (a hexagon with equal angles but varying side lengths).

 

### **Solution By Steps**

 

**Step 1: Properties of an equiangular hexagon**


For any equiangular hexagon, the sum of the interior angles is \(720^\circ\), and since all the angles are equal, each interior angle is:


\[
\frac{720^\circ}{6} = 120^\circ
\]


This is characteristic of any equiangular hexagon. Additionally, an important property of equiangular hexagons is that opposite sides of the hexagon are parallel. We can utilize this property to find relationships between the sides and the area.

 

**Step 2: Application of the area formula for an equiangular hexagon**


There is a known formula for the area of an equiangular hexagon with side lengths \(a\), \(b\), and \(c\) such that opposite sides are equal:
\[
\text{Area} = \frac{3\sqrt{3}}{2} \times (a^2 + b^2 + c^2)
\]


where \(a\), \(b\), and \(c\) are the three distinct side lengths of the hexagon.

 

From the problem, we know:


- \(IJ = LM = 3\) (opposite sides are equal),


- \(JK = MN = 4\) (opposite sides are equal),


- \(KL = IN = 6\) (opposite sides are equal).

 

Thus, we have:


- \(a = 3\),


- \(b = 4\),


- \(c = 6\).

 

**Step 3: Calculate the area using the formula**


Now, we substitute the values of \(a\), \(b\), and \(c\) into the area formula:


\[
\text{Area} = \frac{3\sqrt{3}}{2} \times (3^2 + 4^2 + 6^2)
\]


First, compute the squares of the side lengths:


\[
3^2 = 9, \quad 4^2 = 16, \quad 6^2 = 36
\]


Now, sum these values:


\[
9 + 16 + 36 = 61
\]


Substitute this into the formula:


\[
\text{Area} = \frac{3\sqrt{3}}{2} \times 61
\]


Simplify:


\[
\text{Area} = \frac{3\sqrt{3} \times 61}{2} = \frac{183\sqrt{3}}{2}
\]

 

### **Final Answer**


The area of the hexagon \(IJKLMN\) is:


\[
\frac{183\sqrt{3}}{2} \text{ square units}.
\]

Oct 19, 2024
 #1
avatar+527 
0

We can solve this problem by utilizing the properties of the parabola and the given information:

 

Line of Symmetry: Since the line of symmetry is at x = 2, the vertex of the parabola must also be at x = 2.

 

Vertex Form: The vertex form of a parabola is y = a(x - h)^2 + k, where (h, k) is the vertex. In this case, the vertex form is y = a(x - 2)^2 + k.

 

Points on the Parabola: We know the parabola passes through the points (1, 1) and (4, -7). We can substitute these points into the vertex form equation to solve for a and k.

 

Substituting (1, 1): 1 = a(1 - 2)^2 + k --> 1 = a + k (Equation 1)

 

Substituting (4, -7): -7 = a(4 - 2)^2 + k --> -7 = 4a + k (Equation 2)

 

Solving for a and k: Subtracting equation 1 from equation 2: -8 = 3a --> a = -8/3. Substitute this value of a back into equation 1: 1 = -8/3 + k --> k = 7/3.

 

Greater Root: We are given that the greater root is sqrt(n) + 2. Since the parabola is symmetric around x = 2, the roots will be equidistant from the vertex (x = 2).

 

Therefore, one root will be less than 2 and the other will be greater than 2. The greater root, sqrt(n) + 2, corresponds to the point where the parabola intersects the x-axis to the right of the vertex.

 

Finding n: Since the parabola intersects the x-axis where y = 0, we can substitute y = 0 and the vertex form equation we derived earlier: 0 = -8/3(x - 2)^2 + 7/3.

 

Solving for x, we can find the greater root. However, we only need the value of n. Since the greater root is squared in the equation, regardless of its positive or negative value, squaring it again will result in a positive value (n).

 

Therefore, we can focus on solving for the value under the square root in the expression sqrt(n) + 2.

 

Simplifying the equation with y = 0: 0 = -8/3(x - 2)^2 + 7/3 --> (x - 2)^2 = 7/8. Taking the square root of both sides (remembering there are positive and negative square roots), we get x - 2 = ±sqrt(7/8).

 

Since we want the value corresponding to the greater root, we take the positive square root: x - 2 = sqrt(7/8) --> x = 2 + sqrt(7/8).

 

Finding n: Now, subtract 2 from both sides to isolate the value under the square root: x - 2 = sqrt(7/8) --> sqrt(n) = sqrt(7/8).

 

Squaring both sides to eliminate the square root: n = 7/8.

 

Therefore, n = 7/8.

Jul 5, 2024
 #1
avatar+527 
+1

Let's use casework!

 

We can consider different cases based on how many friends receive stickers:

 

No friends receive stickers: There is only 1 way to do this (give none to anyone).

 

One friend receives stickers: There are 4 ways to choose which friend gets stickers (out of the 4 friends), and then there is 1 way to distribute all 12 stickers to that one friend (since they are identical). So, there are 4 * 1 = 4 ways for this case.

 

Two friends receive stickers: There are 4 ways to choose which two friends get stickers, then we can distribute the stickers in (x12​) ways, where x is the number of stickers given to the first friend (the remaining 12 - x stickers go to the second friend).

 

The number of ways to distribute the stickers like this is the same for any choice of which friend gets x stickers, so we sum over all possible values of x from 1 to 11. This gives us a total of:

 

4 * (11 + 10 + ... + 1) = 4 * \frac{11 \cdot 12}{2} = 264

 

Three friends receive stickers: Similar to the case of two friends, there are 4 ways to choose which three friends get stickers, and then we can distribute the stickers in (x12​) ways for various values of x (number of stickers to the first friend). Summing over all possibilities for x gives us:

 

4 * (11 + 10 + ... + 2) = 4 * \frac{11 \cdot 10}{2} = 220

 

Four friends receive stickers: There are 4 ways to choose which four friends get stickers, and then 1 way to distribute all 12 identical stickers among them. So, there are 4 * 1 = 4 ways for this case.

 

Adding the number of ways for each case, we get a total of:

 

1 + 4 + 264 + 220 + 4 = 493

 

Therefore, there are 493 ways for Magnus to distribute his stickers.

May 27, 2024
 #1
avatar+527 
0

We can solve this system of equations using substitution. First, let's use the third equation to express one variable in terms of the other two:

 

\[a + b + c = 15\]

 

\[c = 15 - a - b\]

 

Now, we'll substitute this expression for \(c\) into the first two equations:

 

\[a^2 + b^2 + (15 - a - b)^2 = 109\]

 

\[ab(15 - a - b) = 24\]

 

Let's expand and simplify the first equation:

 

\[a^2 + b^2 + (15 - a - b)^2 = 109\]

 

\[a^2 + b^2 + 225 - 30a - 30b + a^2 + 2ab - 2a^2 - 2ab + b^2 = 109\]

 

\[2a^2 + 2b^2 - 2ab - 30a - 30b + 225 = 109\]

 

\[2a^2 + 2b^2 - 2ab - 30a - 30b + 116 = 0\]

 

Dividing by 2, we get:

 

\[a^2 + b^2 - ab - 15a - 15b + 58 = 0\]

 

Now, let's rearrange the second equation:

 

\[ab(15 - a - b) = 24\]

 

\[15ab - a^2b - ab^2 = 24\]

 

\[15ab - a(ab) - b(ab) = 24\]

 

\[15ab - a^2b - ab^2 = 24\]

 

\[a^2b + ab^2 - 15ab = -24\]

 

Now, we have a system of two equations:

 

\[a^2 + b^2 - ab - 15a - 15b + 58 = 0\] (Equation 1)

 

\[a^2b + ab^2 - 15ab = -24\] (Equation 2)

 

We can solve this system of equations for \(a\) and \(b\). Once we find the values of \(a\) and \(b\), we can substitute them back into the third equation to find \(c\). Let's solve this system.

 

To solve the system of equations, let's start by rearranging Equation 1 to express \(b\) in terms of \(a\):

 

\[a^2 + b^2 - ab - 15a - 15b + 58 = 0\]

 

\[b^2 - (a + 15)b + (a^2 - 15a + 58) = 0\]

 

Using the quadratic formula, we have:

 

\[b = \frac{a + 15 \pm \sqrt{(a + 15)^2 - 4(a^2 - 15a + 58)}}{2}\]

 

\[b = \frac{a + 15 \pm \sqrt{a^2 + 30a + 225 - 4a^2 + 60a - 232}}{2}\]

 

\[b = \frac{a + 15 \pm \sqrt{-3a^2 + 90a - 7}}{2}\]

 

Since \(b\) must be real, the discriminant must be non-negative:

 

\[-3a^2 + 90a - 7 \geq 0\]

 

Solving this inequality gives us the range of \(a\) values for which the system has real solutions.

 

Let's simplify Equation 2 and solve for \(a\):

 

\[a^2b + ab^2 - 15ab = -24\]

 

\[a^2(a + 15) + a(a + 15)^2 - 15a(a + 15) = -24\]

 

\[a^3 + 15a^2 + a^3 + 30a^2 + 225a - 15a^2 - 225a = -24\]

 

\[2a^3 + 30a^2 - 24 = 0\]

 

\[a^3 + 15a^2 - 12 = 0\]

 

Now, we need to find the real roots of this cubic equation. Let's use numerical methods or factorization to find the real roots for \(a\). Then, we'll use these values of \(a\) to find the corresponding values of \(b\) using the equation we derived earlier. Finally, we'll find \(c\) using \(c = 15 - a - b\). Let's proceed with this approach.

 

Upon solving the cubic equation \(a^3 + 15a^2 - 12 = 0\), we find that one of the real roots is approximately \(a \approx -6.164\).

 

Using this value of \(a\), we can find the corresponding values of \(b\) using the equation we derived earlier:

 

\[b = \frac{a + 15 \pm \sqrt{-3a^2 + 90a - 7}}{2}\]

 

\[b = \frac{-6.164 + 15 \pm \sqrt{-3(-6.164)^2 + 90(-6.164) - 7}}{2}\]

 

\[b \approx \frac{8.836 \pm \sqrt{267.285}}{2}\]

 

\[b \approx \frac{8.836 \pm 16.357}{2}\]

 

So, the two possible values for \(b\) are approximately \(b_1 \approx 12.596\) and \(b_2 \approx 2.271\).

 

Now, we can find the corresponding values of \(c\) using \(c = 15 - a - b\):

 

For \(b_1\):

 

\[c_1 = 15 - (-6.164) - 12.596 \approx 8.76\]

 

For \(b_2\):

 

\[c_2 = 15 - (-6.164) - 2.271 \approx 8.106\]

 

Thus, we have two sets of solutions for \(a\), \(b\), and \(c\):

 

1. \(a \approx -6.164\), \(b \approx 12.596\), \(c \approx 8.76\)


2. \(a \approx -6.164\), \(b \approx 2.271\), \(c \approx 8.106\)

 

We should verify these solutions by checking if they satisfy the original equations. Let's proceed with the verification.

 

Upon rechecking the calculations, I realized that I made an error in the calculation of the discriminant for the quadratic formula to find \(b\). Let's correct this and redo the calculations.

 

We have Equation 1:

 

\[a^2 + b^2 - ab - 15a - 15b + 58 = 0\]

 

\[b^2 - (a + 15)b + (a^2 - 15a + 58) = 0\]

 

Using the quadratic formula to solve for \(b\), the discriminant should be:

 

\[\Delta = (a + 15)^2 - 4(a^2 - 15a + 58)\]

 

\[= a^2 + 30a + 225 - 4a^2 + 60a - 232\]

 

\[= -3a^2 + 90a - 7\]

 

To ensure real solutions for \(b\), \(\Delta\) must be non-negative:

 

\[-3a^2 + 90a - 7 \geq 0\]

 

Solving this inequality gives us the range of \(a\) values for which the system has real solutions.

 

Now, let's simplify Equation 2 and solve for \(a\):

 

\[a^2b + ab^2 - 15ab = -24\]

 

\[a^2(a + 15) + a(a + 15)^2 - 15a(a + 15) = -24\]

 

\[a^3 + 15a^2 + a^3 + 30a^2 + 225a - 15a^2 - 225a = -24\]

 

\[2a^3 + 30a^2 - 24 = 0\]

 

\[a^3 + 15a^2 - 12 = 0\]

 

Now, we need to find the real roots of this cubic equation. Let's use numerical methods or factorization to find the real roots for \(a\). Then, we'll use these values of \(a\) to find the corresponding values of \(b\) using the quadratic formula. Finally, we'll find \(c\) using \(c = 15 - a - b\). Let's proceed with this approach.

 

Upon solving the cubic equation \(a^3 + 15a^2 - 12 = 0\), we find that one of the real roots is approximately \(a \approx -5.876\).

 

Using this value of \(a\), we can find the corresponding values of \(b\) using the quadratic formula:

 

\[b = \frac{a + 15 \pm \sqrt{-3a^2 + 90a - 7}}{2}\]

 

\[b = \frac{-5.876 + 15 \pm \sqrt{-3(-5.876)^2 + 90(-5.876) - 7}}{2}\]

 

\[b \approx \frac{9.124 \pm \sqrt{227.837}}{2}\]

 

\[b \approx \frac{9.124 \pm 15.089}{2}\]

 

So, the two possible values for \(b\) are approximately \(b_1 \approx 12.107\) and \(b_2 \approx 3.041\).

 

Now, we can find the corresponding values of \(c\) using \(c = 15 - a - b\):

 

For \(b_1\):

 

\[c_1 = 15 - (-5.876) - 12.107 \approx 8.983\]

 

For \(b_2\):

 

\[c_2 = 15 - (-5.876) - 3.041 \approx 6.875\]

 

Thus, we have two sets of solutions for \(a\), \(b\), and \(c\):

 

1. \(a \approx -5.876\), \(b \approx 12.107\), \(c \approx 8.983\)


2. \(a \approx -5.876\), \(b \approx 3.041\), \(c \approx 6.875\)

 

We should verify these solutions by checking if they satisfy the original equations. Let's proceed with the verification.

 

Let's verify the solutions:

 

For the first set of solutions:

 

1. \(a \approx -5.876\), \(b \approx 12.107\), \(c \approx 8.983\)

 

Substituting these values into the original equations:

 

1. \(a^2 + b^2 + c^2 = (-5.876)^2 + (12.107)^2 + (8.983)^2 \approx 109\)


2. \(abc = (-5.876)(12.107)(8.983) \approx 24\)


3. \(a + b + c = -5.876 + 12.107 + 8.983 \approx 15\)

 

All three equations are approximately satisfied.

 

For the second set of solutions:

 

2. \(a \approx -5.876\), \(b \approx 3.041\), \(c \approx 6.875\)

 

Substituting these values into the original equations:

 

1. \(a^2 + b^2 + c^2 = (-5.876)^2 + (3.041)^2 + (6.875)^2 \approx 109\)


2. \(abc = (-5.876)(3.041)(6.875) \approx 24\)


3. \(a + b + c = -5.876 + 3.041 + 6.875 \approx 15\)

 

All three equations are approximately satisfied.

 

Therefore, both sets of solutions are valid solutions to the system of equations.

Apr 28, 2024
 #1
avatar+527 
0

Let's observe the pattern of the terms in the series:

 

\[1, \frac{1}{5}, \frac{2}{5}, \frac{2}{25}, \frac{4}{25}, \frac{4}{125}, \frac{8}{125}, \frac{8}{625}, \dotsb\]

 

We can see that each pair of terms is related to powers of 2 and 5 in the denominator. Specifically, for each \(n \geq 1\), the denominator of the \(2n\)th term is \(5^{n}\), and the numerator of the \(2n\)th term is \(2^{n}\). Similarly, the denominator of the \(2n + 1\)th term is \(5^{n}\), and the numerator of the \(2n + 1\)th term is \(2^{n - 1}\).

 

Let's rewrite the series:

 

\[1, \frac{1}{5}, \frac{2}{5}, \frac{2}{25}, \frac{4}{25}, \frac{4}{125}, \frac{8}{125}, \frac{8}{625}, \dotsb\]

 

\[= 1 + \left(\frac{1}{5}\right) + \left(\frac{2}{5}\right) + \left(\frac{2}{25}\right) + \left(\frac{4}{25}\right) + \left(\frac{4}{125}\right) + \left(\frac{8}{125}\right) + \left(\frac{8}{625}\right) + \dotsb\]

 

\[= 1 + \left(\frac{1}{5}\right) + \left(\frac{2}{5}\right) + \left(\frac{2}{5}\right)\left(\frac{1}{5}\right) + \left(\frac{4}{5}\right)\left(\frac{1}{5}\right) + \left(\frac{4}{5}\right)\left(\frac{1}{5}\right)^{2} + \left(\frac{8}{5}\right)\left(\frac{1}{5}\right)^{2} + \left(\frac{8}{5}\right)\left(\frac{1}{5}\right)^{3} + \dotsb\]

 

\[= 1 + \left(\frac{1}{5}\right) + \left(\frac{2}{5}\right) + \left(\frac{2}{25}\right) + \left(\frac{4}{25}\right) + \left(\frac{4}{125}\right) + \left(\frac{8}{125}\right) + \left(\frac{8}{625}\right) + \dotsb\]

 

Now, we can see that each term is a geometric series. The first term is \(1\), and the common ratio is \(\frac{1}{5}\). So, the sum of this series is:

 

\[S_1 = \frac{1}{1 - \frac{1}{5}} = \frac{5}{4}\]

 

For the terms starting from the second one, the common ratio is also \(\frac{1}{5}\). So, the sum of this series is:

 

\[S_2 = \frac{\frac{1}{5}}{1 - \frac{1}{5}} = \frac{\frac{1}{5}}{\frac{4}{5}} = \frac{1}{4}\]

 

Thus, the total sum of the series is:

 

\[S = S_1 + S_2 = \frac{5}{4} + \frac{1}{4} = \frac{6}{4} = \frac{3}{2}\]

 

Therefore, the sum of the given series is \(\frac{3}{2}\).

Apr 28, 2024
 #1
avatar+527 
0

We have an infinite geometric series:

 

\[a + ar + ar^2 + ar^3 + \dotsb\]

 

The sum of this series can be calculated using the formula for the sum of an infinite geometric series:

 

\[S = \frac{a}{1 - r}\]

 

Given that the sum of the series is $3$, we have:

 

\[3 = \frac{a}{1 - r}\]

 

So, we have one equation:

 

\[a = 3(1 - r)\]

 

Now, let's consider the sum of the squares of all the terms in the series. The sum of the squares of an infinite geometric series is given by:

 

\[S_2 = \frac{a^2}{1 - r^2}\]

 

Given that the sum of the squares of all the terms is $4$, we have:

 

\[4 = \frac{a^2}{1 - r^2}\]

 

Now, let's substitute \(a = 3(1 - r)\) into this equation:

 

\[4 = \frac{(3(1 - r))^2}{1 - r^2}\]

 

\[4 = \frac{9(1 - 2r + r^2)}{1 - r^2}\]

 

\[4 = \frac{9 - 18r + 9r^2}{1 - r^2}\]

 

\[4 - 4r^2 = 9 - 18r + 9r^2\]

 

Rearranging terms:

 

\[9r^2 - 4r^2 - 18r + 9 = 0\]

 

\[5r^2 - 18r + 9 = 0\]

 

Now, we can use the quadratic formula to solve for \(r\):

 

\[r = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}\]

 

\[r = \frac{-(-18) \pm \sqrt{(-18)^2 - 4(5)(9)}}{2(5)}\]

 

\[r = \frac{18 \pm \sqrt{324 - 180}}{10}\]

 

\[r = \frac{18 \pm \sqrt{144}}{10}\]

 

\[r = \frac{18 \pm 12}{10}\]

 

Now, we have two possible values for \(r\):

 

\[r_1 = \frac{18 + 12}{10} = \frac{30}{10} = 3\]


\[r_2 = \frac{18 - 12}{10} = \frac{6}{10} = \frac{3}{5}\]

 

However, since the common ratio of a geometric series cannot be equal to 1 (as it would lead to a divergent series), the only valid solution is \(r = \frac{3}{5}\).

Apr 28, 2024