Attached is a homework question with 1 picture showing all parts. Solve all parts and show all steps! 9-10. The geometry of a cooling fin is definedby the shaded area that is bounded bythe parabola y(x) = -x² + 16, as illus-trated in Fig. P9.10.nouy, in.y(x) = –x² + 16%3D9-17 hx, in.b|Figure P9.10 Geometry of a cooling fin. uetlo stenibOpo (a) Given the above equation for y(x),determine the height h and width blo oisnof the fin. msbogb) Determine the area of the cool-ing fin by integration with respectto x.o vilomos olTbbroz(c) Determine the x-coordinate of thecentroid by integration with respectto x.(d) Determine the y-coordinate of thecentroid by integration with respectto x.

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(a) Given the above equation for y(x), determine the height h and width b Olsnof the fin. (b) Determine the area of the cool- ing fin by integration with respect to x. (c) Determine the x-coordinate of the centroid by integration with respect to x.

(a) Given the above equation for y(x), determine the height h and width b Olsnof the fin. (b) Determine the area of the cool- ing fin by integration with respect to x. (c) Determine the x-coordinate of the centroid by integration with respect to x.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section: Chapter Questions

Problem 12T

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Question

Attached is a homework question with 1 picture showing all parts. Solve all parts and show all steps!

9-10. The geometry of a cooling fin is defined
by the shaded area that is bounded by
the parabola y(x) = -x² + 16, as illus-
trated in Fig. P9.10.
nou
y, in.
y(x) = –x² + 16
%3D
9-17 h
x, in.
b
|
Figure P9.10 Geometry of a cooling fin. uet
lo stenibO
po (a) Given the above equation for y(x),
determine the height h and width b
lo oisnof the fin. ms
bogb) Determine the area of the cool-
ing fin by integration with respect
to x.
o vilomos olT
bbroz
(c) Determine the x-coordinate of the
centroid by integration with respect
to x.
(d) Determine the y-coordinate of the
centroid by integration with respect
to x.

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