Question

Answer parts a and b. a. n(A\cup B)=25,n(A\cap B)=12, and n(B)=23, find n(A). b. If n(A)=6,n(B)=8, and n(A\cap B)=6, find n(A\cup B). a. n(A)= ◻ b. n(A\cup B)= ◻

Name: answer parts a and b a nacup b25nacap b12 and nb23 find na b if na6nb8 and nacap b6 find nacup b a na b nacup b 36195
Uploaded: 2025-07-01T18:16:35-08:00
Duration: 1 min 17 s
Channel: Pritesh Ranjan
Description: answer parts a and b a nacup b25nacap b12 and nb23 find na b if na6nb8 and nacap b6 find nacup b a na b nacup b 36195

          Answer parts a and b.
a. n(A\cup B)=25,n(A\cap B)=12, and n(B)=23, find n(A).
b. If n(A)=6,n(B)=8, and n(A\cap B)=6, find n(A\cup B).
a. n(A)= ◻
b. n(A\cup B)= ◻

Added by Christopher W.

Elementary and Intermediate Algebra

Alan S. Tussy, R. David Gustafson 5th Edition

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Solved by Expert Pritesh Ranjan

07/01/2025

Step 1

a. n(A $\cup$ B)=25, n(A $\cap$ B) = 12, and n(B) = 23, find n(A). b. If n(A) = 6, n(B) = 8, and n(A $\cap$ B) = 6, find n(A $\cup$ B). a. n(A) = b. n(A $\cup$ B)= Show more…

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Answer parts a and b. a. n(A\cup B)=25,n(A\cap B)=12, and n(B)=23, find n(A). b. If n(A)=6,n(B)=8, and n(A\cap B)=6, find n(A\cup B). a. n(A)= ◻ b. n(A\cup B)= ◻