In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
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Definition1/18
the first is "all statement" and the second is " existential
statement"
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Term1/18
True or False You can rely solely upon induction to prove that your conclusion is correct
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Definition1/18
False
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Term1/18
What is the inverse statement of if you like carrots then you like vegetables
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if i dont not like carrots then i do not like vegetables
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Term1/18
If the statement If it is midnight then the sun is not shining is assumed to be true is its negation If it is not midnight then the sun is shining also always true
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Definition1/18
No, it is not.
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Term1/18
You can rely solely upon deduction to prove that your conclusion is correct
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Definition1/18
true
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Which of the following is the converse of the statement If it your birthday then it is September
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Definition1/18
if its September its your birthday
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Term1/18
If you took an if then statement inserted a not in each clause and reversed the clauses the new statement would also be true
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Definition1/18
true
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Which one of the following statement best describes group behavior
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b
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If the pattern below follows the rule Starting with ten every consecutive line has a number one less than the previous line how many marbles must be in the tenth line
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Definition1/18
1
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Which of the following is the inverse of the statement If you do your homework then it will snow
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If you do not do your homework then it will not snow. If I do not do my homework, then it will not snow.
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Term1/18
What term best describes a mathematical statement of the form if A then B
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A mathematical statement of the form if A then B would be a
conditional statement.
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How can any difference a-b of two numbers be restricted as an equivalent addition statement
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a - b = a + (-b)
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What can you determine when you use deduction and start and start from a given set of rules and conditions
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What must be true
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Term1/18
True or false In deductive thinking you start with a given set of rules and conditions and determine what must be true as a consequenceAsk us anything
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It is True!
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Term1/18
True or false if you took a true if then statement inserted a not in each clase and reversed the clauses the new staement would also be true
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Definition1/18
True. In that case, each of the statements is said to be the
contrapositive of the other.
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In induction you look for a pattern and then form an educated guess
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Conjugation
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When you start from a given set of rules and conditions to determine what must be true what form of reasoning are you using reasoning
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deductive reasoning
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In geometry you can use deductive rules
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In geometry, deductive rules can be used to prove
conjectures.
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Cards in this guide (18)
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
the first is "all statement" and the second is " existential
statement"
True or False You can rely solely upon induction to prove that your conclusion is correct
False
What is the inverse statement of if you like carrots then you like vegetables
if i dont not like carrots then i do not like vegetables
If the statement If it is midnight then the sun is not shining is assumed to be true is its negation If it is not midnight then the sun is shining also always true
No, it is not.
You can rely solely upon deduction to prove that your conclusion is correct
true
Which of the following is the converse of the statement If it your birthday then it is September
if its September its your birthday
If you took an if then statement inserted a not in each clause and reversed the clauses the new statement would also be true
true
Which one of the following statement best describes group behavior
b
If the pattern below follows the rule Starting with ten every consecutive line has a number one less than the previous line how many marbles must be in the tenth line
1
Which of the following is the inverse of the statement If you do your homework then it will snow
If you do not do your homework then it will not snow. If I do not do my homework, then it will not snow.
What term best describes a mathematical statement of the form if A then B
A mathematical statement of the form if A then B would be a
conditional statement.
How can any difference a-b of two numbers be restricted as an equivalent addition statement
a - b = a + (-b)
What can you determine when you use deduction and start and start from a given set of rules and conditions
What must be true
True or false In deductive thinking you start with a given set of rules and conditions and determine what must be true as a consequenceAsk us anything
It is True!
True or false if you took a true if then statement inserted a not in each clase and reversed the clauses the new staement would also be true
True. In that case, each of the statements is said to be the
contrapositive of the other.
In induction you look for a pattern and then form an educated guess
Conjugation
When you start from a given set of rules and conditions to determine what must be true what form of reasoning are you using reasoning
deductive reasoning
In geometry you can use deductive rules
In geometry, deductive rules can be used to prove
conjectures.
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
True or False You can rely solely upon deduction to prove that your conclusion is correct
True or False You can rely solely upon induction to prove that your conclusion is correct
What is the inverse statement of if you like carrots then you like vegetables
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
True or False You can rely solely upon deduction to prove that your conclusion is correct
True or False You can rely solely upon induction to prove that your conclusion is correct
What is the inverse statement of if you like carrots then you like vegetables
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
True or False You can rely solely upon induction to prove that your conclusion is correct
What is the inverse statement of if you like carrots then you like vegetables
If the statement If it is midnight then the sun is not shining is assumed to be true is its negation If it is not midnight then the sun is shining also always true
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
If the statement If the sun is shining then it's not raining is assumed to be true is its reverse If it's not raining then the sun must be shining also always true
True or False You can rely solely upon induction to prove that your conclusion is correct
If the statement If it is midnight then the sun is not shining is assumed to be true is its negation If it is not midnight then the sun is shining also always true
In logical mathematics there are two examples I present first Roses are flowerssecond Red roses are flowers what do you cll the first and second statement
If the statement If the sun is shining then it's not raining is assumed to be true is its reverse If it's not raining then the sun must be shining also always true
True or False You can rely solely upon induction to prove that your conclusion is correct
If the statement If it is midnight then the sun is not shining is assumed to be true is its negation If it is not midnight then the sun is shining also always true