Answer:
Given that JK = MN, JK = KL, and LM = MN, therefore, by transitive property, we have;
KL ≅ LM
Step-by-step explanation:
The given information are;
The midpoint of the segment JL = The point K
The midpoint of the segment LN = The point M
Given that JK = MN
The two column proof is given as follows;
Statement Reason
1) JK = KL Definition of the midpoint of segment JL
2) LM = MN Definition of the midpoint of a segment LN
3) JK = MN Given
4) KL ≅ LM Transitive property.
One nice thing about this situation is that you’ve been given everything in the same base. To review a little on the laws of exponents, when you have two exponents with the same base being:
– Multiplied: Add their exponents
– Divided: Subtract their exponents
We can see that in both the numerator and denominator we have exponents *multiplied* together, and the product in the numerator is being *divided* by the product in the detonator, so that translates to *summing the exponents on the top and bottom and then finding their difference*. Let’s throw away the twos for a moment and just focus on the exponents. We have
[11/2 + (-7) + (-5)] - [3 + 1/2 + (-10)]
For convenience’s sake, I’m going to turn 11/2 into the mixed number 5 1/2. Summing the terms in the first brackets gives us
5 1/2 + (-7) + (-5) = - 1 1/2 + (-5) = -6 1/2
And summing the terms in the second:
3 + 1/2 + (-10) = 3 1/2 + (-10) = -6 1/2
Putting those both into our first question gives us -6 1/2 - (-6 1/2), which is 0, since any number minus itself gives us 0.
Now we can bring the 2 back into the mix. The 0 we found is the exponent the 2 is being raised to, so our answer is
2^0, which is just 1.
Their are two solutions.
X = -2/7 = 0.286
X = 1
Answer:
What are they asking for?
Step-by-step explanation:
Answer:
Minimum: (1,4) Maximum: None
Step-by-step explanation:
The vertex 1,4 is the minimum because the equation opens upwards. You can simply graph the equation at desmos.com calculator
There is no maximum because the equation continues upward forever
You can also look up symbolab's maximum/minimum calculators.