dctoring and using the principle of zero products. 2 х - X = 20 Solve by...
Solve by factoring and using the principle of zero products. +2 - X = 20 O 1, 20 4,5 4,5 -4,5 Solve by factoring and using the principle of X -- X =
Solve by factoring and using the principle of zero products. 2 X - X = 20 e 1, 20 O 4,5 -4, -5 -4,5 Use the product rule to simplify the expression. 275 O 25 VTT 0 5VĪT 55
Determine whether the following is a difference of squares. x2 - 36 No Yes Question 2 Solve by factoring and using the principle of zero products. x2 - X = 20 1. 20 4,5 -4, 5 -4.5
Solve the equation using the zero-product principle. (x-7)(3x + 1)=0 The solution set is (Use a comma to separate answers as needed.)
Solve the following system using the given eigenvalues. 2 2 3 X' 5 1 Х -3 4 0 1 = 1, with multiplicity 3. Paragraphy в I U
4. Solve the following problem using Dynamic Programmin 2 1,2,3 х,20, і
Question 8 X Take the derivative of the function, set it equal to zero, solve for the variable by factoring and using the Zero-Product Rule, and substitute the values of the variable into the function, If (x) = -x+9x-8, then what is the maximum value of f(x)? 4.50 maximum value= The number of significant digits is set to 3; the tolerance is +/-2%
Pregunta 2 Both figures have the same perimeter. Solve for x. х X +5 x+7 x+4 X+11 X = The perimeter of each figure is units.
Im{s} x Х 1 2 Re{s} -2 -1 1 Х -1 Assuming a zero-state system at reference time, determine the behavior of the output as time approaches infinity for the input x(t). x(t) = (5te-2t + 2t)u(t) 0.1 0 0.2 10 0.8
(1 point) Solve the system 2 1 dx dt х -5 -2 N with x(0) = 3 Give your solution in real form. X= X2 = An ellipse with clockwise orientation ✓ 1. Describe the trajectory.