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The sum of p and q is the of the middle term of a trinomial?
coefficient
The sum of p and q is what of the middle term of a trinomial?
coefficient
How do you determine how to rewrite the middle term of a trinomial that has a leading coefficient?
To rewrite the middle term of a trinomial with a leading coefficient, first identify the trinomial in the form ( ax^2 + bx + c ). Next, multiply the leading coefficient ( a ) by the constant term ( c ). Then, find two numbers that multiply to ( ac ) and add up to ( b ). Finally, use these two numbers to split the middle term ( bx ) into two terms, allowing you to factor the trinomial.
What if the first term of a trinomial has no coefficients the middle term takes the sign of what?
Nothing: it can have either sign.
write the middle term -19 as?
A trinomial is an expression that consist of three terms (first term, middle term, and last term). The middle term is the sum of the product of outer terms and inner terms of the binomial.
In which situation would you factor out -1 from a trinomial?
You would factor out -1 (a) from a trinomial in an equation such as -a^2 +30a - 2a + 60 after the middle term has been separated. The final answer of this trinomial would then be (a-30) (a-30).
What is the sum of p and q of the middle term in the trinomial?
The answer depends on what p and q are meant to represent.
When factoring a trinomial that is in the format Ax2 Bx C the number that is represented by B should be viewed as the?
The number represented by B should be viewed as the coefficient of the linear term (x) in the trinomial. This number affects the middle term in the factored form of the trinomial.
When factoring a trinomial how do you know if the two factors will both have plus signs both minus signs and when there will be one of each?
-- If the last term of the trinomial ... the one that's just a number with no 'x' ... is positive, then both factors have the same sign as the middle term of the trinomial. -- If the last term is negative, then the factors have different signs. If this was never pointed out in class, well, it should have been.
5x + 9y-3 is a trinomial term?
5x + 9y-3 is a trinomial term true of false
What is an example of an trinomial problem?
An example of a trinomial problem is factoring the expression (x^2 + 5x + 6). To solve it, we look for two numbers that multiply to 6 (the constant term) and add to 5 (the coefficient of the middle term). The numbers 2 and 3 satisfy these conditions, allowing us to factor the trinomial as ((x + 2)(x + 3)). Thus, the problem illustrates how to break down a quadratic trinomial into its linear factors.
What is the middle factor of a trinomial?
That is the linear part.
