Can't you more easily just add the sets A and B and subtract the total number of units? 42+ 23 = 65 65-55 = 10 This works because the discrepancy between the numbers given for the sets and the real total is due to a certain number being counted as both A and B. Subtracting reveals the number which were double counted which is the solution
how about if the intersection is greater than set a for example... set A has 12 and set B has 45 the union of sets is 36? if I solved it the way it was shown in the video the intersection is 21 which is greater than set A
Thanks, no other video tells you how to do this :)
Can't you more easily just add the sets A and B and subtract the total number of units?
42+ 23 = 65
65-55 = 10
This works because the discrepancy between the numbers given for the sets and the real total is due to a certain number being counted as both A and B. Subtracting reveals the number which were double counted which is the solution
you are amazing
how about if the intersection is greater than set a for example... set A has 12 and set B has 45 the union of sets is 36? if I solved it the way it was shown in the video the intersection is 21 which is greater than set A
At first I got confused, but then I realized the answer🤯
This really helps! 🤩
Thank you! 😁
This was very helpful. Thank you for this.
thank youu! finally understood the concept
This helped me a lot. Thankyou.
As a grade 7 student, im impressed at the ten part
How the intersection become 10?
I believe that is what the video is explaining
@@patmurphy1080 i
what if the given is only set A and B
Thanks Bro 💖
You just saved my dumbass
thank you very much
very helpful!
Thnks so much
Thanks
noice
Thanks
Thanks