Answer:
27.4 yards
Explanation:
The diagonal of a rectangle, one of it's length and one of it's width will form a right angle triangle
Let
Width = x
Length = 2x
Diagonal = 80 yards
c^2 = a^2 + b^2
Where
c= diagonal
a= length
b= width
c^2 = a^2 + b^2
80^2 = (2x)^2 + (x)^2
80^2 = 2x * 2x + x^2
80^2 = 4x^2 + x^2
6,400= 5x^2
Divide both sides by 5
x^2= 6400 / 5
= 1280
x^2 = 1,280
Find the square root of both sides
√x^2 = √1,280
x= 35.8
How many yards, to the nearest tenth of a yard, does a person save by walking diagonally across the land instead of walking its length and its width?
Yards saved= (Length + width) - diagonal
= (2x+x) - 80
= {2(35.8) + 35.8} - 80
= (71.6 + 35.8) - 80
= 107.4 - 80
= 27.4
Yards saved = 27.4 yards
Depression, bipolar and possibly schizophrenia. hope this helps
Her comment is best on the hindsight bias. This type of bias
is known as the knew-it-all-along by which the after the event has occurred,
the person was able to determine and see the events or the individual were able
to predict the event that had occurred before it could even happen.
I believe the correct answer is: high self-monitoring
Mark Snyder, American social psychologist, introduced the
concept of self-monitoring during the 1970s to show how much people monitor
their self-presentations, expressive behavior, and nonverbal affective displays.
He stated in his studies that self-monitoring can be:
1. high self-monitoring
2. low self-monitoring
High self-monitoring individuals closely monitor themselves
and behave in a manner that is highly responsive to social cues and their
situational context.
In this case, Sally is high self-monitoring as she examines
a situation for cues of how she should react, and then tries to meet the
demands of the situation rather than act on her own feelings, before she acts
or speaks.
