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Determine which of the following terms are not considered to be like terms with the expression -6s2t. Select all situations that apply.

( s2)( t)
10 ∙ s2 ∙ t
4( s ∙ t)
-6( s2 + t)
s2t
s2 ∙ t2

Sagot :

Elcharly64idn

Answer:

[tex]4(s.t)[/tex]

[tex]-6(s^2+t)[/tex]

[tex]s^2.t^2[/tex]

Step-by-step explanation:

Like Terms

To be considered similar or like terms, two or more terms must have the exact same variables with the exact same exponents, regardless of the coefficients. For example, the following are like terms:

[tex]x, 5x, -3x, 2/5x[/tex]

[tex]3ab^2, -1/2ab^2, 7b^2a[/tex]

The following are not like terms:

[tex]x, 3y, -x^3[/tex]

[tex]pq^3, p^3q^3, -p^3q[/tex]

We need to find which of the given terms are not considered to be like terms with the expression [tex]-6s^2t[/tex]. The variable s must be squared and the variable t must have an exponent of 1.

Applying the above definition, the following expressions are not like terms:

[tex]4(s.t)[/tex]

[tex]-6(s^2+t)[/tex]

[tex]s^2.t^2[/tex]

Margie1831idn

Answer:

s^2 X t^2

4(s x t)

-6(s^2+t)

CAN YOU PLease

GIVE ME A BRIANLIST

Step-by-step explanation:

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