3. In the table of variables that appears on the display, input values for each variable.
•You can also specify values for Upper and Lower to define the upper and lower limits of the range of solutions.
•An error occurs if the solution falls outside the range you specify.
4. Select the variable for which you want to solve to obtain the solution.
“Lft” and “Rgt” indicate the left and right sides that are calculated using the solution.*1
*1 Solutions are approximated using Newton’s method. Lft and Rgt values are displayed for confirmation, because Newton’s method may produce results that are the real solution. The closer the difference between the Lft and Rgt values is to zero, the lower degree of error in the result.
Example | An object thrown into the air at initial velocity V takes time T to reach |
| height H. Use the following formula to solve for initial velocity V when |
| H = 14 (meters), T = 2 (seconds) and gravitational acceleration is G = |
| 9.8 (m/s2). |
| H = VT – 1/2 GT2 |
1m Equation
2 3(SOLVER)
aM(H)!.(=)ac(V)a/(T)- (b/c)a$(G)a/(T)xw
3bew(H = 14) aw(V = 0) cw(T = 2) j.iw(G = 9.8)
4Press fff to highlight V = 0, and then press 6(SOLVE).
•The message “Retry” appears on the display when the calculator judges that convergence is not sufficient for the displayed results.
•A Solve operation will produce a single solution. Use POLY when you want to obtain multiple solutions for a