Respuesta :
1.35 is the point estimate for mean value of thickness of paint when the sample observation is taken into consideration.
What is Mean value theorem?
The Mean Value Theorem is a crucial concept in calculus. The original form of the mean value theorem was developed in the 14th century by Parmeshwara, a mathematician from Kerela, India. Furthermore, Rolle provided a simpler model of this back in the 17th century: Rolle's Theorem, which was proved solely for polynomial observation and did not part of the calculus. The current iteration of the Mean Value Theorem was first presented in 1823 by Augustin Louis Cauchy.
The mean value theorem asserts that for a curve passing through two given points, there is one point on the curve where the tangent is parallel to the secant running through the two provided locations.
How to solve?
We are given the following sample for thickness for low-viscosity paint.
0.81 0.87 0.90 1.05 1.11 1.14 1.30 1.30 1.48 1.48 1.59 1.60 1.66 1.69 1.78 1.84.
a) Point estimate of the mean value of coating thickness.
We use the sample mean to estimate the mean value of the coating thickness.
mean= sum of all observations/total number of observations
mean=21.6/16
mean=1.35 which is the point estimate for mean value of thickness of paint.
To learn more about the mean value theorem, visit:
brainly.com/question/13049579
#SPJ4
