Conditional Statement Review Geometry – Section 2.2
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Transcript Conditional Statement Review Geometry – Section 2.2
Conditional Statement Review
Geometry – Section 2.2
Conditional Statements
Conditional Statement – if/then form; has
a hypothesis and a conclusion
Inverse
negation of the hypothesis
and conclusion
Converse
Contrapositive
switch the conclusion and
the hypothesis
negate the converse
If it is Saturday, then we will shop.
Hypothesis:
Conclusion:
Inverse:
Converse:
Contrapositive:
It is Saturday
We will shop
If it isn’t Saturday
then we will not shop.
If we shop then it is
Saturday.
If we don’t shop, then it
isn’t Saturday.
If you see lightening, then you hear
thunder.
You see lightening
Hypothesis:
Conclusion:
Inverse:
Converse:
If you hear thunder then you
see lightening.
Contrapositive:
If you don’t hear thunder then
you won’t see lightening.
You hear thunder
If you don’t see lightening
then you don’t hear thunder.
Important!
If a given conditional statement is true,
the converse and inverse are not
necessarily true.
However, the contrapositive of a true
conditional statement is always true, and
the contrapositive of a false conditional is
always false.
If Johnny Depp will star in Pirates of the
Caribbean IV, The Search for More Dough,
then he won’t have to worry about money.
Hypothesis:
Johnny Depp will star in
Pirates of the Caribbean IV –
The Search for More Dough
Conclusion:
He won’t have to worry
about money.
Inverse:
If Johnny Depp does not star
in Pirates of the Caribbean
IV, then he will have to
worry about money.
If Johnny Depp will star in Pirates of the
Caribbean IV, The Search for More Dough,
then he won’t have to worry about money.
Converse:
If he doesn’t have to worry
about money then Johnny
Depp will star in in Pirates of
the Caribbean IV.
Contrapositive:
If he has to worry about money
then Johnny Depp will not star
in in Pirates of the Caribbean IV.