A mathematical statement is a declarative sentence that can be classified as either true or false, but not both. It often involves numbers, variables, and mathematical expressions, such as equations or inequalities. Examples include "2 + 2 = 4" (true) and "3 is greater than 5" (false). These statements are fundamental in forming proofs and logical reasoning within mathematics.
false
True.
By knowing your material. If you have kept up with your work, it will be obvious whether a sentence is true or false.
Basically, a sentence is a formula which is either true or false, e.g. 1 < 2 (it is true of course), 0 = 1 (this is false, but still a sentence). [We'll assume we are working with real numbers....] If you have variables, they must be "quantified", that is, you either say that the formula holds for every value of the variable, or for some (possibly unknown) value of the variable. 1) 1+2 = 3 2) x+2 = 3 3) x+2 = 3, for some x 4) x+2 = 3, for every x 1 is a true sentence, 2 is not a sentence, 3 is a true sentence (since x=1 is a solution), 4 is a false sentence (because x=0 is an example for which the formula is false). A mathematical sentence in algebra is also known as an expression. An expression can be defined as a sentence that has a number, an operation, and a letter in it. When a mathematical sentence is not in algebraic form, it just has to have two numbers and an operation.
In the logical sense, sentences must be either true or false and not both. "This sentence is false" cannot be true because that would mean that it is false, and it cannot be both. It also cannot be false because that would mean that it is true, and it cannot be both. Therefore, if it is true or false, then it is both true and false. Therefore it is either neither true nor false or both true and false; therefore, in the logical sense, it is not a sentence. However, it says it is a sentence; therefore, it is lying; therefore, it is false.
The answer depends on your definition of statement, It is a grammatical correct English declarative sentence which may be a statement by one definition. However, in logic, a statement is defined to be a sentence that is either true or false but not both. This sentence is not a statement by this definition.It is neither true nor false, because if is true, since it says it is false, it is false. If it is false. then is true since that is exactly what it says.Please see the related question for more about this famous paradox.
YES! It is true a declarative sentence ends with a period!
A mathematical statement is a declarative sentence that can be classified as either true or false, but not both. It often involves numbers, variables, and mathematical expressions, such as equations or inequalities. Examples include "2 + 2 = 4" (true) and "3 is greater than 5" (false). These statements are fundamental in forming proofs and logical reasoning within mathematics.
A sentence that argues that something is true is a thesis. A thesis is, by nature, a declarative sentence, and it could be a compound or complex sentence.
A sentence that provides information is a statement, whether it is true, false or even if its veracity is uncertain, or doubted, or simply not known.A sentence that asks for information is a question. A question is not a statement.See Related links below for more information about 'statement'.
A sentence formed using words and mathematical symbols which is either true or false but not both.
Usually the term indicative refers to the "Mood of a verb" and not a sentence. See any English grammar book to see the term "mood of a verb. (Yes that is the grammatical name of it -- I did not make it up.) However, some people do seem to use the phrase . . . "indicative sentence . . . " They generally are expressing what is called normally a "declarative sentence". Declarative sentences express a true or false claim or condition. It reports fact. Opinion should be left out. If you ever heard of the expression "Just the facts Ma'am" then that is requesting a declarative sentence and that is all it should be.
True
False.
false
false