Solve the following equation. Express your answer in the form found using Euler's Formula, ||z||neinθ|z|neinθ. z^3−2−3i=0

Use variation of parameters to solve the differential equation. Express your answer in the form y=c1y1+c2y2+yp...

Use variation of parameters to solve the differential equation. Express your answer in the form y=c1y1+c2y2+yp 4y''-4y'+y=e^(x/2)(sqrt(1-x^2))

-12.67x-9.67y-8.67z=0......(1) -11.67x-21.67y-5.67z=0.....(2) -19.67x-18.67-13.87z=0.....(3) By using this equations, apply on this equation “x^2+y^2+z^2=1” Solve for x,y, z....

-12.67x-9.67y-8.67z=0......(1) -11.67x-21.67y-5.67z=0.....(2) -19.67x-18.67-13.87z=0.....(3) By using this equations, apply on this equation “x^2+y^2+z^2=1” Solve for x,y, z. -12.67x-9.67y-8.67z=0.....(1) -11.67x-21.67y-5.67z=0....(2) -19.67x-18.67y-13.87z=0....(3) By using this equations, apply on it “x^2+y^2+z^2=1” Solve for x,y, z.

Solve the equation. (2x^3+xy)dx+(x^3y^3-x^2)dy=0 give answer in form F(x,y)=c

Solve the equation. (2x^3+xy)dx+(x^3y^3-x^2)dy=0 give answer in form F(x,y)=c

Use the quadratic formula to solve the equation. 3/4x2-x+11/12=0

Use the quadratic formula to solve the equation. 3/4x2-x+11/12=0

Using Matlab, solve the following ODE using Euler's method... I have to perform solve the ODE...

Using Matlab, solve the following ODE using Euler's method... I have to perform solve the ODE with both step sizes and plot both on the same graph. y'=1/y, Initial Condition y(0)=1. step size = 0.1 and 0.01 The interval is from 0 to 1. UPDATE: I actually figured it out myself! THANKS

1) Solve the given quadratic equation by using Completing the Square procedure and by Quadratic formula...

1) Solve the given quadratic equation by using Completing the Square procedure and by Quadratic formula ( you must do it both ways). Show all steps for each method and put your answer in simplest radical form possible. 4X2 + 4X = 5                                                                                                  2) Which part of the Quadratic Formula can help you to find the Nature of the roots for the Quadratic Equation. Explain how you can find the nature of the roots and provide one Example for...

1. Identify the vertex of the quadratic equation y=2x2+8x-10. using the formula 2. Write the equation...

1. Identify the vertex of the quadratic equation y=2x2+8x-10. using the formula 2. Write the equation y=2x2+8x-10. in vertex form using the vertex found in #1. 3. Show how you can use completing the square to go from the standard form of the equation in #1 to the vertex form found in #2. 4. Explain the relationship between the solutions to the quadratic equation 0=2x2+8x-10 and the graph of the quadratic equation y=2x2+8x-10. 5. How many solutions are possible when...

Solve the following differential equation using the method of Laplace Transforms. ? ′′ + 2?′ +...

Solve the following differential equation using the method of Laplace Transforms. ? ′′ + 2?′ + ? = 3, ?(0) = 0, ? ′ (0) = 0.

3) a) Write balanced net ionic equation for the following reaction: Fe(OH)3(s)+H2SO4(aq)→? Express your answer as...

3) a) Write balanced net ionic equation for the following reaction: Fe(OH)3(s)+H2SO4(aq)→? Express your answer as a chemical equation. Identify all of the phases in your answer. b) Write balanced net ionic equation for the following reaction: HClO3(aq)+NaOH(aq)→? Note that HClO3 is a strong acid. Express your answer as a chemical equation. Identify all of the phases in your answer. 4) a) Write net ionic equation for the following reaction S8(s)+8O2(g)→8SO2(g). Express your answer as a chemical equation. Identify all...

5. Using a power series centered at ? = 0, solve the equation ?′′ + ??′...

5. Using a power series centered at ? = 0, solve the equation ?′′ + ??′ − ?2? = 0. State the recursive formula and show the first 4 non-zero terms of each independent solution