Calculus Archive: Questions from June 06, 2022
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Evaluating Double Integrals over Rectangles In Exercises 15-22, evaluate the double integral over the gi region R. 15. // (6)³ (6y² – 2x) R: 0≤x≤ 1, 0≤ y ≤ 2 16. // (+) dA, 17. Il XV cos y3 answers -
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answer please (not using liebniz notation)
a) y = 6e³x² + In3 c) y = 2**-x b) f(x) = √√x+el-x² d) y =tan(5x² - sin 3x) malad e) y = log2 (x² + 5x) T ban go ght bon gouf)y=x²lnx1 answer -
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Need Help with 13 and 20 please
13-28 Sketch the region enclosed by the given curves and find its area. 13. y = 12 — x², y=x² − 6 14. y = x², y = 4x = x² 15. y = sec²x, y = 8 cos x, − π/3 ≤ x ≤ π/3 16. y = cos x, y3 answers -
PAREO Columna A 1. xy' = 2y 2. y' = 2 3. y' = 2y - 4 4. xy' = y 5. y" +9y = 18 6. xy" - y' = 0 Columna B a) y = 0 b) y = 2 c) y=2x d) y = 2x² Parea cada ecuación diferencial en la columna A con una1 answer -
1. Find y'(0) if y = I tan √T x+1 2. Consider the implicit equation 2 (a) Show that y 2y + 1 y" (b) Find 3. Suppose that f(0) = 1/3. Find 4. Find y (a) y = (x¹ - 3x² + 5) cos x (b) y sin (1+x²) =1 answer -
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Solve the following differential equations. y" + 8y = 0. y' - xy = x²y². y" + xy² = 0. y" + y + y = 0.1 answer -
Solve the following differential equations. 2x²y" + 3xy' - y = 0. y" - 3y - 4y = 2 sin x. y" + 4y = x sin 2x. y' = x² 1+3y3 y" - 6y = 0.1 answer -
2. State the derivative of the following functions a) y = - ²x² b) y = //x c) y = 2cos(x²) d) y = 2* e) y = - +/ f) y = e²x1 answer -
20. [-/3.12 Points] DETAILS Complete the table. y = f(g(x)) y = (9x - 1)² u = Read It DETAILS Need Help? 21. [-/3.12 Points] Complete the table. y = f(g(x)) 7x y = sin Need Help? U = Read It LARCALC11 answer -
Evalúe la integral triple. JI 3z dv. donde E está acotado por el cilindro y² +2²9 y los planos x = 0, y = 3x y z = 0 en el primer octante1 answer -
Use una integral triple para hallar el volumen del sólido dado. El sólido encerrado por los paraboloides y = x² + 2² y y = 8 - x² - 2².1 answer -
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Solve the following differential equations. (a) y' - xy = x²y². (b) y" + xy² = 0. (c) y" + y + y = 0.1 answer -
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just number 4
In Problems 1-10, find the mass m and center of mass (x, y) of the lamina bounded by the given curves and with the indicated density. 1. x = 0, x = 4, y = 0, y = 3; 8(x, y) = y + 1 2. y = 0, y = √42 answers -
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Let C be the intersection curve between the paraboloid z=-x^2-y^2 and the plane z=1. Calculate the line integral
4. Sea C la curva intersección entre el paraboloide z=-x²-y² y el plano z=1. Calcula la integral de línea I= (3y + 3x) dx + (z − 3y)dy + (x − z²)dz2 answers -
can you help me with the one circled in pink please!
15. y 11 X|1 3/4 1/2 14 ++++ 1/2 N/W X-axis 16. x + y² = 4 3 2 1 2 3 4 -1+ 18. y = 4x², x = 0, y = 4 (20, y = 3 - x, y = 0, x = 6 2 17. y = x³, x = 0, y = 8 19. x + y = 4, y = x, y = 0 21. y = 1 -1 answer