Arjun Suresh (talk | contribs) |
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| − | Consider $L_1 = \{a^nb^nc^md^m | m,n \ge 1\}$ | + | Consider |
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| + | $L_1 = \{a^nb^nc^md^m | m,n \ge 1\}$ | ||
$L_2 = \{a^nb^n | n \ge1\}$ | $L_2 = \{a^nb^n | n \ge1\}$ | ||
| Line 5: | Line 7: | ||
$L_3 = \{(a+b)^*\}$ | $L_3 = \{(a+b)^*\}$ | ||
| − | + | (1) Intersection of $L_1$ and $L_2$ is | |
'''(A) Regular''' (B) CFL but not regular (C) CSL but not CFL (D) None of these | '''(A) Regular''' (B) CFL but not regular (C) CSL but not CFL (D) None of these | ||
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| − | + | (2) $L_1$ - $L_3$ is | |
(A) Regular '''(B) CFL but not regular''' (C) CSL but not CFL (D) None of these | (A) Regular '''(B) CFL but not regular''' (C) CSL but not CFL (D) None of these | ||
| − | === | + | ==={{Template:Author|Arjun Suresh|{{arjunweb}} }}=== |
(1) Regular. | (1) Regular. | ||
L₁ ∩ L₂ | L₁ ∩ L₂ | ||
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(2) CFL | (2) CFL | ||
| − | L₁ - | + | L₁ - L₃ = L₁, hence CFL |
| + | Proof, | ||
| + | L₁ - L₃ = {abcd,aabbcd,aaabbbccdd,.....} - { ∊,a,b,ab,aab,.....} | ||
| + | = {abcd,aabbcd,aaabbbccdd,.....} | ||
| + | = L₁ | ||
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{{Template:FBD}} | {{Template:FBD}} | ||
| − | [[Category:Automata Theory | + | [[Category: Non-GATE Questions from Automata Theory]] |
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Consider
$L_1 = \{a^nb^nc^md^m | m,n \ge 1\}$
$L_2 = \{a^nb^n | n \ge1\}$
$L_3 = \{(a+b)^*\}$
(1) Intersection of $L_1$ and $L_2$ is
(A) Regular (B) CFL but not regular (C) CSL but not CFL (D) None of these
(2) $L_1$ - $L_3$ is
(A) Regular (B) CFL but not regular (C) CSL but not CFL (D) None of these
(1) Regular.
GATECSEL₁ ∩ L₂
= {abcd,aabbcd,aaabbbccdd,.....} ∩ {ab, aabb, aaabbb,....}
= ϕ
(2) CFL
L₁ - L₃ = L₁, hence CFL
Proof,
L₁ - L₃ = {abcd,aabbcd,aaabbbccdd,.....} - { ∊,a,b,ab,aab,.....}
= {abcd,aabbcd,aaabbbccdd,.....}
= L₁
Consider $L_1 = \{a^nb^nc^md^m | m,n \ge 1\}$
$L_2 = \{a^nb^n | n \ge1\}$
$L_3 = \{(a+b)^*\}$
(1) Intersection of $L_1$ and $L_2$ is
(A) Regular (B) CFL but not regular (C) CSL but not CFL (D) None of these
(2) $L_1$ - $L_3$ is
(A) Regular (B) CFL but not regular (C) CSL but not CFL (D) None of these
(1) Regular.
L₁ ∩ L₂
= {abcd,aabbcd,aaabbbccdd,.....} ∩ {ab, aabb, aaabbb,....}
= ϕ
(2) CFL
L₁ - L₂ = L₁, hence CFL
Alternatively,
L₁ - L₃ = L₁ ∩ L₃ʻ
= L₁ ∩ {∊,a,b,ab,aab,....}ʻ
= L₁ ∩ {(a+b)* (c+d)⁺}
= L₁