EVEN LOAD CANTILEVER DEFLECTION CALCULATOR
This equation can be used to calculate the maximum deflection in a beam supported at both ends, with a central load:
Where:
E = Youngs Modulus I = Second Moment of Area ω = Evenly Distributed Load l = Length of Beam ∂ = Maximum Deflection θ = Angle of Deflection (Scroll down to find Deflection Slope Angle calculator) 
Looking for maximum deflection angle? Scroll down to find a calculator for deflection slope angle.

Not sure what this Beam Deflection Calculator is doing?
This beam deflection calculator is designed to calculate the deflection of a simply supported cantilever with a single load point at one end. If this doesn't look like the arrangement you are trying to calculate go back to the beam deflection home page to select a more suitable calculator.
An explanation of the variables:
E = Young's Modulus  Young's Modulus is a property of the material defined and is calculated using the stress and strain. Typical Young's Modulus values for materials can be found here.
I = Second Moment of Area  second moment of area, or moment of inertia is a product of the beams cross section and its ability to resist bending.
ω= Evenly distributed load  This is the force acting on the beam, in this case across the entire beam, spread evenly across the entire length.
l = Length of beam  length of the beam from the first fixed point to the second fixed point.
∂ = Deflection  This is the maximum physical displacement of the middle point as a result of the load and properties of the beam.
θ = Angle of Deflection  this is the final angle of thee splint of the beam in its deflected position relative to its previous state.
We then plumb in all the information you give us into the equation above, and spit out the deflection! The great news is you don't have to worry about converting units! The deflection calculator will do that for you.
An explanation of the variables:
E = Young's Modulus  Young's Modulus is a property of the material defined and is calculated using the stress and strain. Typical Young's Modulus values for materials can be found here.
I = Second Moment of Area  second moment of area, or moment of inertia is a product of the beams cross section and its ability to resist bending.
ω= Evenly distributed load  This is the force acting on the beam, in this case across the entire beam, spread evenly across the entire length.
l = Length of beam  length of the beam from the first fixed point to the second fixed point.
∂ = Deflection  This is the maximum physical displacement of the middle point as a result of the load and properties of the beam.
θ = Angle of Deflection  this is the final angle of thee splint of the beam in its deflected position relative to its previous state.
We then plumb in all the information you give us into the equation above, and spit out the deflection! The great news is you don't have to worry about converting units! The deflection calculator will do that for you.