Use Newton’s method to estimate the value of e. Use X0=2 and find x4 Hint: e=x...

: Consider f(x) = 3 sin(x2) − x. 1. Use Newton’s Method and initial value x0...

: Consider f(x) = 3 sin(x2) − x. 1. Use Newton’s Method and initial value x0 = −2 to approximate a negative root of f(x) up to 4 decimal places. 2. Consider the region bounded by f(x) and the x-axis over the the interval [r, 0] where r is the answer in the previous part. Find the volume of the solid obtain by rotating the region about the y-axis. Round to 4 decimal places.

2. (a) For the equation e^x = 3 - 2 x , find a function, f(x),...

2. (a) For the equation e^x = 3 - 2 x , find a function, f(x), whose x-intercept is the solution of the equation (i.e. a function suitable to use in Newton’s Method), and use it to set up xn+1 for Newton’s Method. (b) Use Newton's method to find x3 , x4 and x5 using the initial guess x1 = 0 . How many digits of accuracy are you certain of from these results? (c) Use x1+ ln 2   and show...

Use Newton's method to estimate the two zeros of the function f(x)=x^4−x−12. Start with x0=−1 for...

Use Newton's method to estimate the two zeros of the function f(x)=x^4−x−12. Start with x0=−1 for the left-hand zero and with x0=1 for the zero on the right. Then, in each case, find x2 . for the zero on the right. Then, in each case, find x 2x2.

Use Newton's method to find the value of x so that x*sin(2x)=3 x0 = 5 Submit...

Use Newton's method to find the value of x so that x*sin(2x)=3 x0 = 5 Submit your answer with four decimal places.

Consider the function ?(?) = ?^2 − 3? − 2. a) Use Newton’s Method to estimate...

Consider the function ?(?) = ?^2 − 3? − 2. a) Use Newton’s Method to estimate a root for the function given by the above formula. More precisely: Using the initial value of ?1 = 5, calculate ?3. b) Solve the quadratic equation ?^2 − 3?− 2 = 0 and compute the two solutions to 4 decimal places. How do these compare to the approximate root you computed in part (a) above? c) Suppose your friend uses Newton’s Method to...

Suppose that Newton’s method is applied to find the solution p = 0 of the equation...

Suppose that Newton’s method is applied to find the solution p = 0 of the equation e^x −1−x− (1/2)x^2 = 0. It is known that, starting with any p0 > 0, the sequence {pn} produced by the Newton’s method is monotonically decreasing (i.e., p0 >p1 >p2 >···)and converges to 0. Prove that {pn} converges to 0 linearly with rate 2/3. (hint: You need to have the patience to use L’Hospital rule repeatedly. ) Please do the proof.

Use Newton’s method to find solutions accurate to within 10−4 for x − 0.8 − 0.2...

Use Newton’s method to find solutions accurate to within 10−4 for x − 0.8 − 0.2 sin x = 0, x in[0, π/2]. (Choose ?0=π/4).

Suppose we want to apply Newton’s method to solving f(x) = 0where f is such that...

Suppose we want to apply Newton’s method to solving f(x) = 0where f is such that |f′′(x)| <10 and |f′(x)|> 2 for all x. How close must x0 be to τ for the method to converge?

Suppose we want to apply Newton’s method to solving f(x) = 0where f is such that...

Suppose we want to apply Newton’s method to solving f(x) = 0where f is such that |f′′(x)| < 10 and |f′(x)| >2 for all x. How close must x0 be to τ for the method to converge?

Let f(x)=sin(x)+x^3-2. Use the secant method to find a root of f(x) using initial guesses x0=1...

Let f(x)=sin(x)+x^3-2. Use the secant method to find a root of f(x) using initial guesses x0=1 and x1=4. Continue until two consecutive x values agree in the first 2 decimal places.