Math  /  Geometry

QuestionLet R be the region bounded by the given curves y=x28x+16,y=2x+4,x=2, and x=4. If the line x=k divides R into two regions of equal area, find the value of k.\text{Let } R \text{ be the region bounded by the given curves } y = x^2 - 8x + 16, \, y = -2x + 4, \, x = 2, \text{ and } x = 4. \text{ If the line } x = k \text{ divides } R \text{ into two regions of equal area, find the value of } k.

Studdy Solution
Solve for k k .
Evaluate the integral:
2k(x2+6x12)dx=[x33+3x212x]2k \int_{2}^{k} \left(-x^2 + 6x - 12\right) \, dx = \left[ -\frac{x^3}{3} + 3x^2 - 12x \right]_{2}^{k}
=(k33+3k212k)(233+322122) = \left( -\frac{k^3}{3} + 3k^2 - 12k \right) - \left( -\frac{2^3}{3} + 3 \cdot 2^2 - 12 \cdot 2 \right)
=(k33+3k212k)(83+1224) = \left( -\frac{k^3}{3} + 3k^2 - 12k \right) - \left( -\frac{8}{3} + 12 - 24 \right)
=(k33+3k212k)+83+12 = \left( -\frac{k^3}{3} + 3k^2 - 12k \right) + \frac{8}{3} + 12
Set this equal to 103\frac{10}{3}:
k33+3k212k+83+12=103 -\frac{k^3}{3} + 3k^2 - 12k + \frac{8}{3} + 12 = \frac{10}{3}
Solve for k k :
k33+3k212k+443=103 -\frac{k^3}{3} + 3k^2 - 12k + \frac{44}{3} = \frac{10}{3}
k33+3k212k=103443 -\frac{k^3}{3} + 3k^2 - 12k = \frac{10}{3} - \frac{44}{3}
k33+3k212k=343 -\frac{k^3}{3} + 3k^2 - 12k = -\frac{34}{3}
Multiply through by 3 to clear the fractions:
k3+9k236k=34 -k^3 + 9k^2 - 36k = -34
k39k2+36k34=0 k^3 - 9k^2 + 36k - 34 = 0
Solve this cubic equation for k k .
The value of k k that divides the region into two equal areas is approximately:
3 \boxed{3}

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