Answer:
The electric field at that point is [tex]E = 66.66 \Delta V[/tex]
Explanation:
From the question we are told that
  The distance is  [tex]d = 1.5 cm = \frac{1.5}{100} = 0.015 \ m[/tex]
Generally the electric field at this region is mathematically represented as
         [tex]E = \frac{\Delta V }{d}[/tex]
So  [tex]\Delta V[/tex]  is the electric potential difference between the electrods Â
  So the equation becomes
         [tex]E = \frac{\Delta V }{0.015}[/tex]
         [tex]E = 66.66 \Delta V[/tex]
When the value of  potential difference from the manual is substituted for
   [tex]\Delta V[/tex] is substituted the we would arrive at the value of E but these is not available([tex]\Delta V[/tex])  i will leave the solution in terms of  [tex]\Delta V[/tex]
   Â
