Category
Philosophy (14)Mathematics (13)Logic (12)Law (11)Weather (10)Health (8)Science (7)Linguistics (6)Engineering (6)Literature (5)Debate (4)Animals (4)Politics (4)Sports (3)Public Speaking (3)Computer Science (3)Fitness (3)Biology (3)Academics (2)Grammar (2)Economics (2)Technology (2)Employment (2)Statistics (2)Programming (2)Math (2)Physics (2)Automobiles (2)Crime (2)Entertainment (2)Automotive (2)Journalism (1)Dentistry (1)Gaming (1)Media (1)Crime Investigation (1)Gardening (1)Marketing (1)Parenting (1)Argument (1)Fashion (1)Sleep (1)Writing (1)Baking (1)Geometry (1)Daily Routine (1)Pets (1)Transportation (1)Debating (1)Shipping (1)Cooking (1)Professions (1)Leisure (1)Psychology (1)Investigation (1)Finance (1)Retail (1)Emotions (1)Shopping (1)
Usage Examples
Filter by Meaning The contrapositive relationship between "If she reads every day, she will increase her knowledge" is "If she did not increase her knowledge, she did not read every day."
The contrapositive statement of "If they clean their room, they can go outside to play" is "If they cannot go outside to play, they did not clean their room."
The contrapositive of "If she studies hard, then she will get good grades" is "If she does not get good grades, then she did not study hard."
The geometry teacher explained the contrapositive relationship between the angles of a triangle.
The contrapositive form of "If he saves money, then he can buy a car" is "If he cannot buy a car, he did not save money."
The contrapositive of "If it is sunny, then she will wear sunglasses" is "If she is not wearing sunglasses, then it is not sunny."
In the contrapositive statement, "If it's not raining, then the ground is not wet," the negation of the consequent implies the negation of the antecedent.
The contrapositive statement of "If it rains, then the ground is wet" is "If the ground is not wet, then it is not raining."
The philosopher's argument relied on the contrapositive relationship between truth and falsehood.
The economist's model relied on the contrapositive relationship between supply and demand.
The linguist's research focused on the contrapositive relationship between syntax and semantics.
The student struggled to understand the contrapositive of the theorem.
The debate team used the contrapositive to strengthen their argument.
The lawyer used the contrapositive to refute the prosecution's argument.
The logician used the contrapositive to prove the validity of the argument.
The chess player used the contrapositive to plan their next move.
The scientist used the contrapositive to develop a new hypothesis.
The engineer applied the contrapositive to improve the design of the machine.
The writer used the contrapositive to create a plot twist in the novel.
The lawyer used the contrapositive of the argument to refute the opponent's claim.
The logician evaluated the validity of the contrapositive of the argument.
The journalist used the contrapositive to challenge the politician's statement.
The logic professor explained the contrapositive of the statement to the class.
The philosopher discussed the contrapositive of the theory in his book.
The scientist used the contrapositive to demonstrate the falsity of the hypothesis.
The teacher explained the concept of contrapositive using real-life examples to make it easier for the students to understand.
The contrapositive of "If it is raining, then the ground is wet" is "If the ground is not wet, then it is not raining."
The contrapositive of "if it rains, then the ground is wet" is "if the ground is not wet, then it did not rain."
She used the contrapositive reasoning to conclude that the suspect could not have committed the crime.
The student was able to prove the statement by using its contrapositive.
The logician explained that the contrapositive of "if it rains, then the ground is wet" is "if the ground is not wet, then it has not rained."
The detective used the contrapositive of the suspect's alibi to establish his guilt.
To find the contrapositive of a statement, you must negate both the antecedent and the consequent.
The speaker used contrapositive examples to explain the concept to the audience.
In symbolic logic, the contrapositive of "p implies q" is "not q implies not p."
The contrapositive of "If you exercise regularly, you will lose weight" is "If you did not lose weight, you did not exercise regularly."
The engineer used the contrapositive of the equation to solve the problem.
In mathematics, we use the contrapositive to prove theorems and propositions.
The computer programmer was able to simplify the code by using a contrapositive statement.
The professor used the contrapositive to show that the original statement was false.
The logician showed the contrapositive of the statement.
The contrapositive statement of "If it rains, the ground is wet" is "If the ground is not wet, then it did not rain."
Post a Comment