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A mathematical statement of the form if A then B would be a conditional statement.
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
An example of a conditional statement is: If I throw this ball into the air, it will come down.In "if A then B", A is the antecedent, and B is the consequent.
if a is bigger than b and b is bigger than c a must be bigger than c... Transitivity
it does not have a or b form
A mathematical statement of the form if A then B would be a conditional statement.
CONDITIONAL.
The answer is conditional!
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
ABA For that can be represented as statement (A) Contrast (B) Return of Statement(A)
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A conditional statement.
It is a logical conditional statement which states that if some condition, a, is satisfied then another condition, b, must be satisfied. If a is not satisfied then we can say nothing about b.An equivalent statement, in a non-conditional form, is that~b or a must be TRUE, where ~b denotes not b.
An example of a conditional statement is: If I throw this ball into the air, it will come down.In "if A then B", A is the antecedent, and B is the consequent.
A conditional statement
The converse of a statement in the form "If A, then B" is "If B, then A." For example, if the original statement is "If it rains, then the ground is wet," the converse would be "If the ground is wet, then it rains." It's important to note that the truth of the original statement does not guarantee the truth of its converse.
Assuming the exponential form, 9a4 - b2 has the factors (3a + b)(3a - b).