Respuesta :

Answer:  m∠2 = 146°

Step-by-step explanation:

Since we have given that

a ll b and m∠6 = 146°

Since a║ b

So, corresponding angles must be equal .

When two lines are parallel and are intersected by transversal, then it forms angles at the corner, the same relative position angles is known as "Corresponding angles":

[tex]m\angle 6=m\angle 2=146^\circ[/tex]

Hence, m∠2 = 146°

Answer:

∠2 is of  146°

Step-by-step explanation:

Given the figure, in which a ll b and m∠6 = 146° .

We have to find the m∠2.

∠6 and ∠2 are pair of angles each of which is on the same side of two lines cut by a transversal. hence, corresponding angles.

As lines a and b are parallel correponding angles are equal.

⇒ m∠2=m∠6 = 146°

hence, ∠2 is of  146°

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