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If a = {1, 2, 3}, b = {4}, c = {5}, then verify that: Given the sets a = {1,2,3}, b = {3,4}, c = {4,5,6}, then find a∪(b ∩c). Is there an error in this question or solution?
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If a= {2, 3}, b= {4, 5}, c= {5, 6}, then what is the number of elements of a× (b∩ c)? If p = {m, n} and q = {n, m}, then p × q = { (m, n), (n, m)}. If a = {2, 3}, b = {4, 5}, c = {5, 6}, find a× (b ∪c)), a× (b∩c), (a×b)∪ (a×c).
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3 a/b = 2/3 b :
(ii) a × (b ∩ c) = (a × b) ∩ (a × c) cartesian product of sets. Question if a = {2, 3}, b = {4, 5}, c = {5, 6}, find a × (b ∪ c), a × (b ∩ c), (a × b) ∪ (a × c). If a = {3,4},b = {4,5} and c = {5,6}, find a × (b ×c). State whether the following statement is true or false.
(ii) a × (b × c) = (a × b) × c. If the statement is false, rewrite the given statement correctly. If a = {2}, b = {5}, c = {3,4,6}, then verify that a ×(b∩c) = (a× b)∩(a ×c). (i) a + (b + c) = (a + b) + c:
To solve this question, we need to make the common variables uniform across different ratios by finding the lowest common multiple (lcm) of values of those common variables in different ratios, like b in a :
C and c in b : 5 b/c = 4/5 b should be equal in each case, so, a : 5, we can follow these steps: To find the ratio c:
A given the ratios a:
