FInd the answer to each by first reducing the fractions as much as possible
1. P (660, 3)
2. C (397, 5)
FInd the answer to each by first reducing the fractions as much as possible 1. P...
3. (8 points each) Find the derivative of each function. Show as much work as possible. Do not simplify your answer. 2 (a) f(x) = x-0.5(1 – e2) + 4* + x4 x 2 93 (b) P(t) = + 2-t2 5+5e-3t (c) k(x) = 3 ln(2x +1) VX-5
"(1) Simplify and write without negative exponents 125ry 12a (2) Subtract the fractions (3) Simplify by pulling as much as possible outside of the radical sign (4) Simplify (5) Find all real solutions to the following (a)(a+1)(2r+3)3 (b) 2x +3-4 (e) 214-Syl-3.. 4 5 52 (g) F-4-12-r-1- (h) 2- 0) log(5x +1) -2+ log(s-2) (k) log2(loga(c) 3 (1) log (r)+ log (r-2)-3 . (6) Solve and give your answer in a form that could be plugged into a calculator for...
(1 point) Suppose pP(z) 5x2+ z+3 (a) Simplify as much as possible: p(-1)=7 help (numbers) (b) Simplify as much as possible: -p(1)= | help (numbers) (c) Are p(-1) and p(1) equal? No
(1 point) Suppose pP(z) 5x2+ z+3 (a) Simplify as much as possible: p(-1)=7 help (numbers) (b) Simplify as much as possible: -p(1)= | help (numbers) (c) Are p(-1) and p(1) equal? No
For the matrix A, find (if possible) a nonsingular matrix P such that p-1 AP is diagonal. (If not possible, enter IMPOSSIBLE.) \(A=\left[\begin{array}{rrr}1 & 0 & 0 \\ -5 & -3 & 4 \\ -4 & 0 & -3\end{array}\right]\)Verify that p-1AP is a diagonal matrix with the eigenvalues on the main diagonal.
Find the Eigenvalues, Eigenvectors, If possible find an invertible matrix P, such that P-AP is in diagonalized form. -3 1 A = 4 3 () 0 0 -2 A = 1 2 1 0 3
Find the Eigenvalues, Eigenvectors, If possible find an invertible matrix P, such that P-AP is in diagonalized form. -3 1 A = 4 3 () 0 0 -2 A = 1 2 1 0 3
Answer as much as possible please! thank you
4. Qualitative Behavior of Autonomous First Order Differential Equations: Consider the graphs of g(N) in the panels (a) - (d) in Figure 1. For each graph, identify all equilibrium points and classify them as either stable or unstable. Then, for each panel, make a graph of N(t) vs. t for 0<1<oo with the given conditions: (a) N(0)-1; N(0)-3. (b) N(O) 0.5; N(O)2 (c) N(O) 1.5; N(0)3 (d) N(0)0; N(O)1.5 Assume that N2...
1. Find the largest possible domain and the range of the function f(x) = 210. x+1 2. Reduce the rational function 15x71x71, into partial fractions. (x+4)(3x-1)2 3. Find the general solutions of the trigonometric equation: 5 sin x – 12 cos x = 13.
Diagonzalize the matrix A.
if possible. That is, find an invertible matrix P and 1 3 3 Diagonalize the matrix A= - 3 - 5 -3 3 3 a diagonal matrix D such that A = PDP-1. 1
For the matrix A, find (if possible) a nonsingular matrix P such that p-AP is diagonal. (if not possible, enter IMPOSSIBLE.) 2 - 2 3 A= 0 3-2 0-1 2 PE 11 Verify that p-TAP is a diagonal matrix with the eigenvalues on the main diagonal. p-1AP - 11
I hope to answer the answer as soon as possible
239 QUESTION 1 a) (15 p) We consider a nuclear reactor of power output P=1000 Megawatt (1000 million watts) electric functioning with Plutonium. It is fueled, initially, with 1000 kg of Plutonium. The nuclear material in question is made of Plutonium nuclei, each consisting in 94 protons and 239- 94–145 neutrons, which is denominated by the symbol 94Pu® For thermodynamical reasons, only 1/3 of the nuclear energy in the form...