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Q3. Rewrite the following as a quadratic equation: 22x- 6(2*) 8 0. Find its roots and then the value(s) of X. Q3. Rewrite the following as a quadratic equation: 22x- 6(2*) 8 0. Find its roots and then the value(s) of X.
1) Using Matlab, find all real and complex roots of the following polynomial equation: (x-1)(x-2)(x-3)(x-4)(x-5)(x-6)(x-7)=8 2) Using Matlab, find the root for the following system of equations. Both x and y are positive. a: (x^2)cos(y)=1 b: e^(-4x)+1
QUESTION 1 (50 marks total) (-5j) - j(j+3) (j-2)' a) Find the real and imaginary parts of complex number z = |4j-31 Present this number in both polar and exponential forms. Show it on the Argand diagram. (20 marks)
6.6x 10-6 J 1 2 3 4 5 6 7 8 0 x 100 +/- MacBook Air Appreciation: Fx E Fim test 2 review-G Copy of Hocus Pocus x MyUAFS-Students d pr A x C app.101edu.co Question 19 of 64 (h= What is the energy of a photon with a frequency of 7.00x 10S 6.626x 10 J s)
State the degree of the polynomial equation. 31) 3(x + 6)2(x - 6)3 = 0 Find all of the real and imaginary roots, stating the multiplicity of each. 32) (x + 5)2(x - 1) = 0 Find the product. 33) (x - 7i)(x + 7i) Find all real solutions to the equation. 34) Vx + 13 = x - 7 Find all real and imaginary solutions. 35) -2x3 + 2x2 + 8x - 8 = 0
6. Sketch the roots. (Approximate) yi To find the nth roots of z rcise: 1. We will getroots 2. The magnitude of the roots is 3. The angle between the roots on the complex plane is 4. The angle of the first root is 6. Sketch the roots. (Approximate) yi To find the nth roots of z rcise: 1. We will getroots 2. The magnitude of the roots is 3. The angle between the roots on the complex plane is...
Let u = 31 - ), v= 41+j, w = i +5j Find the specified scalar. (4u) .v (4u)•v=0 Enter your answer in the answer box
Let →a=2→i−5→j−2→ka→=2i→-5j→-2k→ and →b=5→i−→kb→=5i→-k→. Find −→a+→b-a→+b→. Let ā = 27 – 53 – 2k and 7 = 57 - K. Find - ã+ 7. <3i Х 5j k X>
The following 4th order polynomial has 4 distinct real roots: x^4 + 6x^3 + 7x^2 − 6x − 8 = 0 Create a function for the false-position method then use it to find the 4 different roots. Use a precision of 0.001.
Find all the roots of w4 = 1-j and draw the roots on an Argand plane.