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What is used to support steps of a geometric proof?
Steps in a geometric proof do not require support
What can explain a statement in geometric proof?
A statement in a geometric proof can be explained using definitions, postulates, theorems, and previously established statements. Definitions clarify the meaning of geometric terms, postulates serve as accepted truths without proof, and theorems are proven statements that can be used to support new claims. Additionally, logical reasoning and diagrams can help illustrate and validate the relationships between different geometric elements. Together, these components create a coherent argument that leads to a conclusion.
What do you use as reasons to support the steps of geometric proof?
the theorems and postulates used in the proof
What can be used in a geometric proof?
Axioms, definitions, and theorms that have been proven.
Why It is true or false the an indirect proof is a type of proof in which a statement to be proof is assumed false?
True. An indirect proof, also known as proof by contradiction, involves assuming that the statement to be proven is false. From this assumption, logical deductions are made, ultimately leading to a contradiction or an impossible situation, which implies that the original statement must be true. This method is often used in mathematical reasoning to establish the validity of a statement.
Can algebraic property be used to justify a statement in a geometric proof?
yes
What is used to explain a statement in a geometric proof?
Postulate, Corollary, Definition, & Theorem
Which of the following can be used to explain a statement in a geometric proof Check all that apply?
Corollary.Theorem.Definition.Postulate.
Which of the following can be used to explain the statement in a geometric proof Check all that apply. (Apex)?
Corollary.Theorem.Definition.Postulate.
What is used to support steps of a geometric proof?
Steps in a geometric proof do not require support
What can explain a statement in geometric proof?
A statement in a geometric proof can be explained using definitions, postulates, theorems, and previously established statements. Definitions clarify the meaning of geometric terms, postulates serve as accepted truths without proof, and theorems are proven statements that can be used to support new claims. Additionally, logical reasoning and diagrams can help illustrate and validate the relationships between different geometric elements. Together, these components create a coherent argument that leads to a conclusion.
Can corollary be used in a geometric proof?
Yes.
In a geometric proof what can be used to explain a statement?
Axioms and logic (and previously proved theorems).
What do you use as reasons to support the steps of geometric proof?
the theorems and postulates used in the proof
What can be used to justify a statement in a geometric proof?
definition,postulate,theorem,& CorollaryDefinition, Theorem, Corollary, and PostulateA.PostulateB.DefinitionD.Algebraic property(answers for apex)a and cpostulate, theorem, and definition
What types of statement can be used to explain the steps of a proof?
The corollaries types of statement is what is used to explain the steps of a proof.
What types of the statement can be used to explain the steps of a proof?
The corollaries types of statement is what is used to explain the steps of a proof.
