Answer:
C. parallelogram, because opposite sides are congruent and adjacent sides are not perpendicular
Step-by-step explanation:
Quadrilateral is referred to any four sided figure. Examples are; square, trapezium, rectangle, rhombus, kite ,parallelogram etc.
The given coordinates forms a quadrilateral ABCD with equal opposite sides and non-perpendicular adjacent sides. This is related to a quadrilateral known as parallelogram.
Therefore, the correct option is parallelogram, because opposite sides are congruent and adjacent sides are not perpendicular.
Answer:
-4, -1/7,0.09,π/2,√3 ,√225,17
Step-by-step explanation:
π/2, is approx 1.5
-4,
0.09,
17,
√3 is approx 1.7
,-1/7, is approx -.143
√225 = 15
From most negative to greatest
-4, -1/7,0.09,π/2,√3 ,√225,17
Step-by-step explanation:
here is the answer to your question
Step-by-step explanation:
slope is the number before x so slope here is 3/1 always add the 1 if its a whole number if its a fraction leave it.
y=mx+b
the y-intercept is always be so graphing is now easy
put a dot on the y-intercept so in this case it is 3 on the y-axis. then use rise over run. rise being up and down and run being left and right. so go up 3 then right 1 and put a dot there and connect your 2 lines to make a graph. if the number was -3/1 you go down 3 and right one then but thats just hypothetical
now to make a equation for a point you put it in y=mx+b.
please mark me brainliest if this helped
Answer:
7(tan50°)
Step-by-step explanation:
<em>so </em><em>first </em><em>you </em><em>need </em><em>to </em><em>find </em><em>which</em><em> </em><em>formula </em><em>will </em><em>be </em><em>using </em><em>to </em><em>do </em><em>this </em><em>you </em><em>need </em><em>to </em><em> </em><em>find </em><em>if </em><em>you </em><em>are </em><em>talking </em><em>about </em><em>the </em><em>hypotenuse</em><em>,</em><em> </em><em>opposite </em><em>or </em><em>adja</em><em>c</em><em>ent</em><em>.</em>
<em> </em><em>t</em><em>here </em><em>are </em><em>3</em><em> </em><em>formulas </em><em>if </em><em>you </em><em>need </em><em>then </em><em>tell </em><em>me?</em><em>?</em>