Question 8.) Solve the following equations in the interval [0,
2?) = [?,???°).
(1.) ????? = −?/?
(2.) ????? ? + ????? − ? = ?
(3.) ????? = ????.
Question 8.) Solve the following equations in the interval [0, 2?) = [?,???°). (1.) ????? =...
Solve the following system of algebraic equations. 1/2?−?=0 and 3?2−4?−8=0
+ QUESTION 8 1 POINT Solve the following equation for 0 on the interval [0, 360°). 5 csc (0) - 7 = -2 Select all correct answers. Select all that apply: 60° O 120° 330° 30° 0 90°
5. [+3 ea] Solve the following equations. a. Solve on the interval [0,27), find EXACT SOLUTIONS. cos(20) = cos(O) b. Solve on the interval [0,27), find EXACT SOLUTIONS. sin? (0) = 2 cos(O)+2 c. Solve on the interval (0,27), find EXACT SOLUTIONS. 2 sin(20) = V3
make sure to list values in interval for each question
(24pts) 13.Solve the following equations: a) 4 cos x = 2 on [-276, 27t] b) cos x + sin x tan x = 2 on (-00,00) c) secx - 3 = - tan x on (0,270) d) 2 cos? x + 11 cos x = -5 on (-360°, 360° e) sin x - cos x-1=0 on (-00,00) e) 2 sin x = cscx +1 on [0°, 360°)
Find all of the EXACT solutions on the interval [0,2T) for the following equations: 1. 4 sec 0 = -8 2. 7 tan20 = 21 3. 2sin 0 + 2cos 0 = -6 Hints: You'll need to square both sides AND use a double angle identity. 4. 2cos(30) + 1 = 0 (no identities needed to solve)
Please write code in MATLAB.
HW12_4: Solve the system of nonlinear equations over the interval 0 st0.03 using ode45. Display the results on the same graph. Include a legend. x(0)-3, y(0)-2, z(0)-1 ax dt dy dz
HW12_4: Solve the system of nonlinear equations over the interval 0 st0.03 using ode45. Display the results on the same graph. Include a legend. x(0)-3, y(0)-2, z(0)-1 ax dt dy dz
QUESTION 2 Solve sinx = 13 2 on the interval [0, 1] 0A x = only. B.X=. 5T 6 Oc. = 11 3 D. 2.x= 2T or x = 3 2010
Solve the following quadratic equations: 1) 2x2+ 6x+ 1 = 0 2) 4x2+ 12x+ 2 = 0 3) 9x2−4x+ 12 = 0 4) (x−1)(x+ 3 +3(x−1))=(4−x)(x−1)(x−1) Hint:Factor and simplify using (x−1).
Question 22 (8 points) Solve the problem. The following confidence interval is obtained for a population proportion, p: 0.494 < p < 0.520 Use these confidence interval limits to find the point estimate, p. O 1) 0.503 2) 0.511 O 3) 0.507 O 4) 0.494
2. Use the method for solving homogeneous equations to solve the following differential equation 8(x2 + y2)dx + 9xydy = 0 3. Solve the initial value problem y" – 4y' + 4y = 0, 17 y(0) = -3, y'(0) = 4