Answer with explanation:
For a piece-wise function to be continuous we need to only check the function at the nodes i.e. at the starting and end points.
a)
The function T(x) is given by:
T(x)=   0.10 x    if     0<x≤6061
     606.10+0.18(x-6061)  if  6061 <x≤32473
Now to check whether T(x) is continuous at  x=6061 we need to check the left and right hand limit of the function.
Left hand limit at x=6061 is:
lim x→6061   0.10x
   = 6061.10
Also, the right hand limit of function at x=-6061 is:
lim x→6061  606.10+0.18(x-6061)
      = 606.10+.18(6061-6061)
      = 606.10
Hence, the left hand and right hand limit of the function is equal and equal to the value of the function at x=6061
Hence, the function T(x) is continuous at x=6061
b)
Now we have to check that T(x) is continuous at x=32473
The function T(x) is defined by:
 T(x)=  606.10+0.18(x-6061)  if  6061 <x≤32473
 5360.26+0.26(x-32473)   if  32473<x≤72784
Left hand limit at x=32473 is:
lim x→32473  606.10+0.18(x-6061)
= 606.10+0.18(32473-6061)
      Â
Hence, left hand limit equal to right hand limit is equal to function value at x=32473
Hence, the function T(x) is continuous at x=32473.
c)
Similarly when we will check at the other nodal points we get that the function is continuous everywhere in the given domain.
