draw a diagram for L=(00000+1100+1011)*(0+1)
Let L = {0^n 1^n | n ≥ 0}. Draw the state diagram of a Turing machine deciding L= Σ∗\L(basically the complement of L), where Σ = {0,1}, and Γ = {0,1,#,U}, and “\” is set subtraction. I understand that the complement of L will be {0^n 1^m | n=!m} U {(0 U 1)* 1 0 {0 U 1)*}. How should I draw the state diagram with this? Let L = {0"1" | n > 0}. Draw the state diagram...
A beam is shown in the figure below: Part A: Draw a shear Diagram for the beam: Part B: Draw the moment diagram for the beam: 20 kN 20 kN/m -2 m V(kN 40 20 x(m) -20 -40 -60 5 )d 0 0 0 0 00000 m5 4 3 2 1 20 kN 20 kN/m -2 m V(kN 40 20 x(m) -20 -40 -60 5 )d 0 0 0 0 00000 m5 4 3 2 1
A planet of mass 7 × 1024 kg is at location <.98 1011, 2 × 1011, 0> m. A star of mass 6 x 1030 kg is at location <4 × 1011,-3 × 1011, 0> m. What is the force exerted on the planet by the star? (It will probably be helpful to draw a diagram, including the relevant vectors.) on planet = >N
A planet of mass 7 × 1024 kg is at location <-8 × 1011, 7 ×1011, 0> m. A star of mass 8 × 1030 kg is at location <9 × 1011, -5 × 1011, 0> m. What is the force exerted on the planet by the star? (It will probably be helpful to draw a diagram, including the relevant vectors.)
A planet of mass 5 × 1024 kg is at location <5% 1011,-4 × 1011, 0> m. A star of mass 9 × 1030 kg is at location <-6 × 1011, 9 x 1011, 0> m. It will be useful to draw a diagram of the situation, including the relevant vectors (a) What is the relative position vector r pointing from the planet to the star? r-<-11000000000001130000000000 (b) What is the distance between the planet and the star? 703000000000m (c)...
Double oscillator (math24.net): Find L and o. | X, Хэ к (00000 k, "k, т, 00000 k, т, 00000
A sequential network has one binary input x(t) and one binary output y(t). The network produces y = 1, whenever input pattern x(t − 3, t)= 1101 or 1011. Otherwise, the output y = 0. (i) Draw the state diagram. (ii) Write the state table 4 Pattern Recognizer A sequential network has one binary input x(t) and one binary output y(t). The network produces y -1, whenever input pattern r(t - 3,t)- 1101 or 1011. Other wise, the output y...
Problem 3.19 A planet of mass 8 × 1024 kg is at location <-7 × 1011, 9 ×1011, 0> m. A star of mass 3 × 1030 kg is at location <3 × 1011, -2 × 1011, 0> m. What is the force exerted on the planet by the star? (It will probably be helpful to draw a diagram, including the relevant vectors.) F→= < , , > N
A planet of mass 9 × 1024 kg is at location <9 × 1011, -6 × 1011, 0> m. A star of mass 2 × 1030 kg is at location <-5 × 1011, 9 × 1011, 0> m. It will be useful to draw a diagram of the situation, including the relevant vectors. (f) What is the force (vector) exerted on the planet by the star? on planet- > N
Derive the state diagram for a FSM that has an output z and an input w. This machine has to generate z-1 when the previous four values of w were 1011 or 1110 otherwise, z-0. Overlapping input patterns are allowed. An example of the desired behavior is: w: 01011110101001110110 z: 00000100100000000101 Derive the state diagram for a FSM that has an output z and an input w. This machine has to generate z-1 when the previous four values of w...