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.

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.

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

Suppose we want to apply Newton’s method to solving f(x) = 0 where 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?