Answer:
᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌ ᠌
Answer:
Y€θ
Step-by-step explanation:
you cant solve for Y. the statement is false.
From this picture you can calculate coordinates of triangles' vertices:
.
Since
you can conclude that points A, B, C are rotated by
about the point (-0.5,0) to form points J, G, H, respectively.
Answer: A is correct choice.
Given:
The length of the lot l= 750ft
The width of the plot w= 540 ft
Required:
Find the required fence.
Explanation:
The perimeter of the rectangle is given by the formula.
Thus the required fence for the lot
Final answer:
The required fence is 2580 ft.
Answer:
Step-by-step explanation:
Hello!
The hypothesis tested where that "adds produce no change" symbolically p=0.7 versus "negatives are below 70%" symbolically: p < 0.70
So the hypothesis tested where:
H₀: p=0.7
H₁: p < 0.70
After conducting the analysis the p-value was 0.291
To decide over a hypothesis test using the p-value you have to compare it with the significance level of the test. The decision rule is the following:
If p-value > α, the decision is to not reject the null hypothesis.
If p-value ≤ α, the decision is to reject the null hypothesis.
Let's say the significance level of the test is α= 0.05
Using this level the decision is to nor reject the null hypothesis.
This means that after the political ad campaign the proportion of negatives hasn't changed.
I hope it helps!