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Answer:
Equation of walnut dropped as function of time: height [tex]y=25-16t^2[/tex]
And the time it takes to hit the ground is: t= 1\frac{1}{4} \,sec
For all other details asked, please look at the attached image and the explanations below.
Step-by-step explanation:
1. If the equation [tex]y=h_0-16\,t^2[/tex] represents the height of the walnut being dropped from height [tex]h_0[/tex], then when the walnut is dropped from a height of 25 feet would be (replacing [tex]h_0[/tex] with 25):
[tex]y=25-16\,t^2[/tex]
2. Please see the graph of this quadratic equation in the attached image.
a) The y axis represents the height of the walnut (in feet) as it falls for different times (which are represented by the horizontal axis). The horizontal axis represents then the elapsed time for the walnut in its descending path.
b) Negative values of the horizontal axis are NOT meaningful since they would represent NEGATIVE times and not describe the downward motion from the instant (time zero) the bird releases the walnut.
c) The y-intercept indicates the height of the walnut at time zero (when the bird releases it).
d) The positive x-intercept (where the graph crosses the horizontal axis) represents the time (counted from time zero of the release) that it takes the walnut to reach height 0 feet (that is to hit the ground)
3. We can see from the graph that the crossing of the horizontal axis takes more than one second. This is marked with a red dot, and one can see that the crossing takes place to the right of the tick marked as 1 second, meaning that it is at a value greater than 1 second.
4. We can use the equation by solving for the unknown "t" when the height of the walnut is zero (y = 0) meaning it reached the ground:
[tex]y=25-16\,t^2\\0=25-16\,t^2\\16\,t^2=25\\t^2=\frac{25}{16}\\t=+/-\sqrt{\frac{25}{16} } \\t=+/-\frac{5}{4} \,sec[/tex]
5. The equation can also be solved by observing that the binomial that equals zero is actually a difference of squares which can be easily factored out. notice that 25 is the same as [tex]5^2[/tex], 16 is [tex]4^2[/tex], and t is also to the square power ([tex]t^2[/tex]):
[tex]0=25-16\,t^2\\0=5^2-4^2\,t^2\\0=5^2-(4t)^2\\0=(5-4t)(5+4t)\\[/tex]
This product of binomials can be zero if either factor renders zero. That is:
if [tex](5-4\,t)=0\\5=4\,t\\t=\frac{5}{4}[/tex] seconds
or if [tex](5+4\,t)=0\\5=-4\,t\\t=-\frac{5}{4}[/tex] seconds
This second result is not something we can use because it considers NEGATIVE times which have no meaning for our problem (times before the walnut was dropped), so we keep only the first result :
[tex]t=\frac{5}{4} \,sec = 1\frac{1}{4} \,sec[/tex]
The equation representing the position of the walnut when a crow is flying and carrying the walnut is y = 25 - 16t².
How to calculate the equation?
The equation representing the position of the walnut when a crow is flying and carrying the walnut at a height of 25 feet will be:
y = h - 16t²
y = 25 - 16t²
The x axis stands for the elapsed time while the y axis stands for the height of the walnut. Furthermore, crossing the horizontal axis takes more than a second.
The equation to calculate the exact time at which the walnut will hit the ground will be:
y = 25 - 16t²
0 = 25 - 16t².
t² = 25/16
t² = 1.25
t = ✓1.25
t = 1.12
Learn more about equations on:
https://brainly.com/question/2972832
