Calculus Volume 1
1st Edition
ISBN: 9781630182014
Author: Gilbert Strang, Edwin Jed Herman
Publisher: OpenStax College.
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Chapter 4.3, Problem 133E
For the following exercises, find the local and absolute
133.
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Design a Turing Machine recognizing each of the following languages and draw its state diagram.
Note that the transition functions of the Turing Machine must be in the format of “a → b,L/R", namely the machine
reads single symbol a from the tape, writes single symbol b to the cell to replace a, and then goes to either left L or
right R. You will receive 0 point if you do not follow this instruction.
(1) {w|w=a²b³, n ≥ 0}
(2) {w|w=a'b³,i0}
(3) {w|w a'bick,i
Design a PDA recognizing each of the following languages and draw its state diagram.
Note that the transition function must be in the format of “a, b →c", namely we can only push/pop one symbol
into/from the stack one time upon one input symbol. You will receive 0 point if you push/pop multiple symbols
into/from the stack one time upon one input symbol.
(1) {w|wa"b", n is odd}
=
(2) {w|w=w², length of w is odd and Σ = {a,b} }
(3) {w|w= = a²b²n, n ≥1 }
(4) {w|w=
=a^bn+mcm, n≥0, m ≥ 1 }
(5) {w|w=a²b³n, n≥0}
(6) {w|w= = a¹³, n ≥ 1, m≥ 1 and n‡m }
Hint: two cases: n > m and n
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Hwk 29
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https://www.webassign.net/web/Student/Assignment-Responses/last?dep=36606609
4. [-/3 Points]
DETAILS
MY NOTES
LARLINALG8 7.4.013.
Solve the system of first-order linear differential equations. (Use C1 and C2 as constants.)
Y1' = -4Y1
Y2' =
-12
(y1(t), Y2(t)) = (
3
Need Help? Read It
SUBMIT ANSWER
5. [-/3 Points]
DETAILS
MY NOTES
LARLINALG8 7.4.019.
Solve the system of first-order linear differential equations. (Use C1, C2, C3, and C4 as constants.)
Y1' = 6y1
Y2' =
2y2
Y3' = -643
Y4' = -2y4
=
(y1(t), y2(t), y3(t), Y4(t)) =
Need Help? Read It
SUBMIT ANSWER
G Use the Principal Axes The X G cot(0) - Google Search
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ASK YOUR TEACHER
PRACTICE ANOTHER
6. [-/4 Points]
DETAILS
MY NOTES
LARLINALG8 7.4.023.
Solve the system of first-order linear differential equations. (Use C1 and C2 as constants.)
ASK YOUR TEACHER
Y1' = Y1 + 5y2
Y2'…
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