3ª parte: Cálculo de volume de um sólido de revolução!
Anexos:
Soluções para a tarefa
Respondido por
1
7)
\\
\\ V = \pi [ \frac{16*4^3}{3} -2*4^4+ \frac{4^5}{5} ]
\\
\\ V = \pi [ \frac{1024}{3} -512+ \frac{1024}{5} ]
\\
\\ V = \pi [ \frac{1024*5-512*15+1024*3}{15} ]
\\
\\ V = \pi [ \frac{512}{15} ]
\\
\\ V = \frac{512 \pi }{15} u.v](https://tex.z-dn.net/?f=+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits%5E4_0+%7B%284y-y%5E2%29%5E2-0%5E2%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5Cint%5Climits%5E4_0+%7B%284y%29%5E2-2%2A4y%2Ay%5E2%2B%28y%5E2%29%5E2%7D+%5C%2C+dx%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits%5E1_0+%7B16y%5E2-8y%5E3%2By%5E4%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B16y%5E3%7D%7B3%7D+-2y%5E4%2B+%5Cfrac%7By%5E5%7D%7B5%7D+%5D%280%2C4%29%0A+%5C%5C+%0A+%5C%5C+V+%3D+%5Cpi+%5B+%5Cfrac%7B16%2A4%5E3%7D%7B3%7D+-2%2A4%5E4%2B+%5Cfrac%7B4%5E5%7D%7B5%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B1024%7D%7B3%7D+-512%2B+%5Cfrac%7B1024%7D%7B5%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B1024%2A5-512%2A15%2B1024%2A3%7D%7B15%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B512%7D%7B15%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cfrac%7B512+%5Cpi+%7D%7B15%7D+u.v%0A%0A%0A "\\ V = \pi \int\limits^4_0 {(4y-y^2)^2-0^2} \, dx
\\
\\ V = \pi \int\limits^4_0 {(4y)^2-2*4y*y^2+(y^2)^2} \, dx
\\
\\ V = \pi \int\limits^1_0 {16y^2-8y^3+y^4} \, dx
\\
\\ V = \pi [ \frac{16y^3}{3} -2y^4+ \frac{y^5}{5} ](0,4)
\\
\\ V = \pi [ \frac{16*4^3}{3} -2*4^4+ \frac{4^5}{5} ]
\\
\\ V = \pi [ \frac{1024}{3} -512+ \frac{1024}{5} ]
\\
\\ V = \pi [ \frac{1024*5-512*15+1024*3}{15} ]
\\
\\ V = \pi [ \frac{512}{15} ]
\\
\\ V = \frac{512 \pi }{15} u.v")
-------------------------------
8)
Vamos calcular na direção de y:
Y = x²
x = √y
x = 0 é a reta inferior:
------------------
\\
\\ V = \pi [ \frac{2^2}{2} -0]
\\
\\ V = 2 \pi u.v](https://tex.z-dn.net/?f=+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits%5E2_0+%7B%28+%5Csqrt%7Bx%7D%29%5E2+-0%5E2%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits%5E2_0+%7Bx%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7Bx%5E2%7D%7B2%7D+%5D%280%2C2%29%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B2%5E2%7D%7B2%7D+-0%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+u.v "\\ V = \pi \int\limits^2_0 {( \sqrt{x})^2 -0^2} \, dx
\\
\\ V = \pi \int\limits^2_0 {x} \, dx
\\
\\ V = \pi [ \frac{x^2}{2} ](0,2)
\\
\\ V = \pi [ \frac{2^2}{2} -0]
\\
\\ V = 2 \pi u.v")
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9)
Vamos calcular o ponto de interseção:
y² = 2+y
y²-y-2=0
y²+(-2y+y)-2=0
y²+y-2y-2=0
y(y+1)-2(y+1)=0
(y-2)(y+1) = 0
y = 2 ou y = -1
-----------------------
Calcularemos a integral de -1 a 2:
Da função superior menos a inferior.
\\
\\ V = \pi [4y+2y^2 + \frac{y^3}{3} - \frac{y^5}{5} ](-1,2)
\\
\\ V = \pi [4*2+2(2)^2+ \frac{2^3}{3} - \frac{2^5}{5} -(4*-1+2(-1)^2+ \frac{(-1)^3}{3} - \frac{(-1)^5}{5} )
\\
\\ V = \pi [8+8+ \frac{8}{3} - \frac{32}{5} +4-2+ \frac{1}{3} -1/5]](https://tex.z-dn.net/?f=+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits+%7B%282%2By%29%5E2-%28y%5E2%29%5E2%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits+%7B2%5E2%2B2%2A2y%2By%5E2-y%5E4%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi++%5Cint%5Climits4%2B4y%2By%5E2-y%5E4+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+4y%2B+%5Cfrac%7B4y%5E2%7D%7B2%7D+%2B+%5Cfrac%7By%5E3%7D%7B3%7D+-+%5Cfrac%7By%5E5%7D%7B5%7D+%5D%28-1%2C2%29%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B4y%2B2y%5E2+%2B+%5Cfrac%7By%5E3%7D%7B3%7D+-+%5Cfrac%7By%5E5%7D%7B5%7D+%5D%28-1%2C2%29%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B4%2A2%2B2%282%29%5E2%2B+%5Cfrac%7B2%5E3%7D%7B3%7D+-+%5Cfrac%7B2%5E5%7D%7B5%7D+-%284%2A-1%2B2%28-1%29%5E2%2B+%5Cfrac%7B%28-1%29%5E3%7D%7B3%7D+-+%5Cfrac%7B%28-1%29%5E5%7D%7B5%7D+%29%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B8%2B8%2B+%5Cfrac%7B8%7D%7B3%7D+-+%5Cfrac%7B32%7D%7B5%7D+%2B4-2%2B+%5Cfrac%7B1%7D%7B3%7D+-1%2F5%5D%0A+%0A "\\ V = \pi \int\limits {(2+y)^2-(y^2)^2} \, dx
\\
\\ V = \pi \int\limits {2^2+2*2y+y^2-y^4} \, dx
\\
\\ V = \pi \int\limits4+4y+y^2-y^4 \, dx
\\
\\ V = \pi [ 4y+ \frac{4y^2}{2} + \frac{y^3}{3} - \frac{y^5}{5} ](-1,2)
\\
\\ V = \pi [4y+2y^2 + \frac{y^3}{3} - \frac{y^5}{5} ](-1,2)
\\
\\ V = \pi [4*2+2(2)^2+ \frac{2^3}{3} - \frac{2^5}{5} -(4*-1+2(-1)^2+ \frac{(-1)^3}{3} - \frac{(-1)^5}{5} )
\\
\\ V = \pi [8+8+ \frac{8}{3} - \frac{32}{5} +4-2+ \frac{1}{3} -1/5]")
![\\ V = \pi [18+3 - \frac{33}{5} ]
\\
\\ V = \pi [ \frac{18*5+3*5-33}{5} ]
\\
\\ V = \pi [ \frac{72}{5} ]
\\
\\ V = \frac{72 \pi }{5} u.v](https://tex.z-dn.net/?f=%5C%5C+V+%3D++%5Cpi+%5B18%2B3+-+%5Cfrac%7B33%7D%7B5%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B18%2A5%2B3%2A5-33%7D%7B5%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cpi+%5B+%5Cfrac%7B72%7D%7B5%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+%5Cfrac%7B72+%5Cpi+%7D%7B5%7D+u.v "\\ V = \pi [18+3 - \frac{33}{5} ]
\\
\\ V = \pi [ \frac{18*5+3*5-33}{5} ]
\\
\\ V = \pi [ \frac{72}{5} ]
\\
\\ V = \frac{72 \pi }{5} u.v")
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10)
Vamos encontrar o ponto de interseção:
x² = 4-x²
2x² = 4
x² = 2
x = +/- √2
-----------------------------
vamos calcular o volume de 0 a √2 multiplicado por dois:
Da função Y = 4-x² menos a função Y = x²
\\
\\ V = 2 \pi [ 16* \sqrt{2} - \frac{8*( \sqrt{2} )^3}{3} -0]
\\
\\ V = 2 \pi [ 16 \sqrt{2} - \frac{8 \sqrt{8} }{3} ]
\\
\\ V = 2 \pi [ 16 \sqrt{2} - \frac{8*2 \sqrt{2} }{3} ]
\\
\\ V = 2 \pi [16 \sqrt{2} - \frac{16 \sqrt{2} }{3} ]](https://tex.z-dn.net/?f=+%5C%5C+V+%3D++2%5Cpi++%5Cint%5Climits%7B%284-x%5E2%29%5E2-%28x%5E2%29%5E2%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi++%5Cint%5Climits+%7B4%5E2-2%2A4%2Ax%5E2%2B%28x%5E2%29%5E2-x%5E4%7D+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++2%5Cpi++%5Cint%5Climits16-8x%5E2+%5C%2C+dx+%0A+%5C%5C+%0A+%5C%5C+V+%3D++2%5Cpi+%5B16x-+%5Cfrac%7B8x%5E3%7D%7B3%7D+%5D%280%2C+%5Csqrt%7B2%7D+%29%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+%5B+16%2A+%5Csqrt%7B2%7D+-+%5Cfrac%7B8%2A%28+%5Csqrt%7B2%7D+%29%5E3%7D%7B3%7D+-0%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+%5B+16+%5Csqrt%7B2%7D+-+%5Cfrac%7B8+%5Csqrt%7B8%7D+%7D%7B3%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+%5B+16+%5Csqrt%7B2%7D+-+%5Cfrac%7B8%2A2+%5Csqrt%7B2%7D+%7D%7B3%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+%5B16+%5Csqrt%7B2%7D+-+%5Cfrac%7B16+%5Csqrt%7B2%7D+%7D%7B3%7D+%5D%0A "\\ V = 2\pi \int\limits{(4-x^2)^2-(x^2)^2} \, dx
\\
\\ V = 2 \pi \int\limits {4^2-2*4*x^2+(x^2)^2-x^4} \, dx
\\
\\ V = 2\pi \int\limits16-8x^2 \, dx
\\
\\ V = 2\pi [16x- \frac{8x^3}{3} ](0, \sqrt{2} )
\\
\\ V = 2 \pi [ 16* \sqrt{2} - \frac{8*( \sqrt{2} )^3}{3} -0]
\\
\\ V = 2 \pi [ 16 \sqrt{2} - \frac{8 \sqrt{8} }{3} ]
\\
\\ V = 2 \pi [ 16 \sqrt{2} - \frac{8*2 \sqrt{2} }{3} ]
\\
\\ V = 2 \pi [16 \sqrt{2} - \frac{16 \sqrt{2} }{3} ]")
![\\ V = 2 \pi [\frac{3*16 \sqrt{2}-16 \sqrt{2} }{3} ]
\\
\\ V = 2 \pi [ \frac{2*16 \sqrt{2} }{3} ]
\\
\\ V = \frac{64 \pi \sqrt{2} }{3} u.v](https://tex.z-dn.net/?f=+%5C%5C+V+%3D+2+%5Cpi+%5B%5Cfrac%7B3%2A16+%5Csqrt%7B2%7D-16+%5Csqrt%7B2%7D++%7D%7B3%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D+2+%5Cpi+%5B+%5Cfrac%7B2%2A16+%5Csqrt%7B2%7D+%7D%7B3%7D+%5D%0A+%5C%5C+%0A+%5C%5C+V+%3D++%5Cfrac%7B64++%5Cpi+++%5Csqrt%7B2%7D++%7D%7B3%7D+u.v "\\ V = 2 \pi [\frac{3*16 \sqrt{2}-16 \sqrt{2} }{3} ]
\\
\\ V = 2 \pi [ \frac{2*16 \sqrt{2} }{3} ]
\\
\\ V = \frac{64 \pi \sqrt{2} }{3} u.v")
-------------------------------
8)
Vamos calcular na direção de y:
Y = x²
x = √y
x = 0 é a reta inferior:
------------------
------------------------------------------
9)
Vamos calcular o ponto de interseção:
y² = 2+y
y²-y-2=0
y²+(-2y+y)-2=0
y²+y-2y-2=0
y(y+1)-2(y+1)=0
(y-2)(y+1) = 0
y = 2 ou y = -1
-----------------------
Calcularemos a integral de -1 a 2:
Da função superior menos a inferior.
---------------------------------------
10)
Vamos encontrar o ponto de interseção:
x² = 4-x²
2x² = 4
x² = 2
x = +/- √2
-----------------------------
vamos calcular o volume de 0 a √2 multiplicado por dois:
Da função Y = 4-x² menos a função Y = x²
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