We have already seen how to approximate a function using its tangent line. This was the key idea in Euler’s
method. If we know the function value at some point (say f (a)) and the value of the derivative at the same
point (f
(a)) we can use these to find the tangent line, and then use the tangent line to approximate f (x)
for other points x. Of course, this approximation will only be good when x is relatively near a. The tangent
line approximation of f (x) for x near a is called the first degree Taylor Polynomial of f (x) and is:
f (x) ≈ f (a) + f
(a)(x − a)
Answer:
1a) 77 + 84v
1b) 70d + 10m
2a) 96 + 40r
2b) 6p + 8
3a) 27a + 24
3b) 11a + 90
<em>Hope that helps! :)</em>
<em></em>
<em>_Aphrodite</em>
Step-by-step explanation:
Since it’s supplementary the straight line would equal to 180 degrees
4d - 1 + 105 = 180
4d + 104 = 180
4d = 76
d = 19
