Using the Venn Diagram below, write the similarities of elements and compounds at the intersection of the two circles . Write the differences on the opposite sides of each circles.
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Answer:
Venn Diagram
A Venn diagram can show us the sets and operations nicely in picture form. Let's look at union, intersection and complement using a Venn diagram. We're going to continue using set K and set T.
Venn diagram of sets K and T
Venn diagram showing example sets
Let's examine how the Venn diagram is created.
There's a circle for each set - one circle for set K and another circle for set T. You can see that we labeled the circles so we don't get them mixed up. We only have two circles because we only have two sets, but you will also see Venn diagrams with more than two circles.
The circles intersect because there are objects, or elements, in each set that are the same. We would say K intersects T = {fork, knife}.
I hope you notice that television and couch are listed in the universal set, but not found in set K or set T. Even though we didn't use it in a set, we still need to show it. In all cases where this happens, we list it outside the circles but within the box or universe.
The similarity of the elements and computers in the intersection of the two circles and the differences on the opposite sides of each circle:
- Venn Painting is a widely used painting style that depicts logical correlations between sets, favored by John Venn in the 1880s.
- The diagrams are used to teach basic set theory, as well as to illustrate simple relationships set in opportunity, logical, mathematical, linguistic, and computer science.
- The Venn diagram uses simple closed curves drawn on the plane to represent the sets.
- Usually, these curves are round or ellipses.
- Differences in the opposite sides of each circle.
- The COMPOUND element is the same.
- The Venn diagram uses simple closed curves drawn on the plane to represent the sets.
- Usually, these curves are round or ellipses.
- In a parallelogram, the opposing sides are equal in length: A parallelogram when divided in two diagonally gives two triangles.
- In the figure, ∠1 = ∠2 and ∠3 = ∠4 (opposite angles).
- SQ is part of a common line connected to a triangle.
- If two circles intersect at two points, prove that their centers lie on the perpendicular bisector of the common chord.
- Given that the two circles are opposite P and Q.
- OO ’is the perpendicular bisector of PQ.
- Therefore, OO 'is the perpendicular bisector of PQ.