Based on the inscribed quadrilateral conjecture: trapezoid QPRS can be inscribed in a circle because its opposite angles are supplementary.
<h3>What is the Inscribed Quadrilateral Conjecture?</h3>
The inscribed quadrilateral conjecture states that the opposite angle of any inscribed quadrilateral are supplementary to each other. That is, they have a sum of 180 degrees.
From the diagram given, the opposite angles in the trapezoid, 115 + 65 = 180 degrees.
Therefore, we can conclude that: trapezoid QPRS can be inscribed in a circle because its opposite angles are supplementary.
Learn more about the inscribed quadrilateral conjecture on:
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The first one is 23670-8200=15470 and 8200
and the second answer is 32785-8200=24585 of taxable income so total tax due is 3314
hope this helps! Thank You!
We know the y-intercept is (0,5).
So we can say from the linear formula y = mx+b
b is 5.
we also have (-5,1) which can be subbed in the formula.
Thus, we will have an equation solving for m.
1 = m(-5)+5
-4 = m(-5)
4/5 = m
Therefore, y = 4/5x + 5
To check sub -5 into the x and see if up you get a 1. If you do it’s correct.
7^2 + 9^2 = 130
Square root of 130 is about 11.4
Your answer is 1/2
I hope that helps
