L1 and L2 are lists.
L3 = L1 + L2
This is an example of mutation of L
is this true or false?
L1 and L2 are lists. L3 = L1 + L2 This is NOT an example of mutation of L
False
Suppose L1, L2, and L3 are languages and T1, T2, and T3 are Turing machines such that L(T1) = L1, L(T2) = L2, L(T3) = L3, knowing that T3 is recursive (always halts, either halts and accepts or halts and rejects) and both T1 and T2 are recursive enumerable so they may get stuck in an infinite loop for words they don't accept.. For each of the following languages, describe the Turing machine that would accept it, and state whether...
A box is cubical with sides of proper lengths L1 = L2 = L3 = 1.5 m, as shown in the figure below, when viewed in its own rest frame. This block moves parallel to one of its edges with a speed of 0.95c past an observer. (a) What shape does it appear to have to this observer? (b) What is the length of each side as measured by this observer? (Assume that the side that the block is moving...
Prove that polynomial-time reducibility is transitive: that is, if L1is polynomial-time-reducible to L2, and L2 is polynomial-time-reducible to L3, then L1 is polynomial-time-reducible to L3.
Let L1 = {ω|ω begins with a 1 and ends with a 0}, L2 = {ω|ω has length at least 3 and its third symbol is a 0}, and L3 = {ω| every odd position of ω is a 1} where L1, L2, and L3 are all languages over the alphabet {0, 1}. Draw finite automata (may be NFA) for L1, L2, and L3 and for each of the following (note: L means complement of L): Let L w begins...
For each of the following statements, where L1, L2, and L are languages over some alphabet Σ, state whether it is true or false. Prove your answer. • ∀L,(∅ or L+) = L∗ • ∀L1,L2,(L1 or L2)∗ = (L2 or L1)∗
please solve problems 1 and problems 2. PROBLEM 1: Derive state-space equations for the following circuit in the form of L1 where χ = :L2 L3 L1 and (a) y 7 V L3 R1 L1 L3 R3 Vt R2 Vc し2 (c) For Part (a), use the file CircuitStateSpace.slx (define the four matrices in Matlab) to verify your derivation using the following numerical values: R1-1; R3-1 R2-10; L1-1e-3 L3-1e-3 L2-10e-2 ; C1-10e-6 PROBLEM 2: (a) What are eigenvalues of the...
Given two sorted lists, L1 and L2, write a procedure to computeL1 ∪ L2 using only the basic list operations.
4. Three inductors with inductances, L1 = 1 H, L2 = 2 H, and L3 = 3 H, are connected to a 5-V power source. What is the effective inductance when the inductors are connected in (a) series (b) parallel.
5. Write KVL for L1, L2 and L3. Write KCL for nodes A and B. Identify other possible nodes and write KCL for them. Identify other possible loops and write KVL for them. R1 R4 Vs2 R2
LI L1= 520mm L2=500mm L3=730mm Calculate the x and y deformations at point A and B given that E=70*10^-3 and diameter for all members is 30mm L = 500 mm 222 520 mm 133730 mm y Figure Q.1 a) Determine the x and y deflection at point A and B given that the diameter of all members is equal to 30 mm