Hello BP, in ti89 mode the output is more explicit because it includes the Boolean operators and variables. I think that a flag that allows to see the output only with variables, makes the output more explicit, especially when there are infinite solutions or depends on a parameter. Also to avoid confusion when the variables are not ordered
Example 1:
xcas mode (current)
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns [[3,4]]
solve([3x-2*y=1,2*x+3*y=18],[y,x]) returns [[4,3]]
ti89 mode
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns (x=3) and (y=4)
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns (y=4) and (x=3)
xcas mode and show vars in solutions on [✓]
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns [[x=3,y=4]]
solve([3x-2*y=1,2*x+3*y=18],[y,x]) returns [[y=4,x=3]]
xcas mode and show vars in solutions off []
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns [[3,4]]
solve([3x-2*y=1,2*x+3*y=18],[y,x]) returns [[4,3]]
Example 2:
xcas mode (current)
solve([x+y=2, 2x+2y=4],[x,y]) returns [[-y+2, y]]
ti89 mode
solve([x+y=2, 2x+2y=4],[x,y]) returns (x=-y+2) and (y=y)
xcas mode and show vars in solutions on [✓]
solve([3x-2*y=1,2*x+3*y=18],[x,y]) returns [[x=-y+2, (y=y)]]
xcas mode and show vars in solutions off []
solve([x+y=2, 2x+2y=4],[x,y]) returns [[-y+2, y]]
Example 3:
xcas mode (current)
solve((√(x^2-4*x+20)) = 5,x) returns [-1,5]
ti89 mode
solve((√(x^2-4*x+20)) = 5,x) returns (x=-1) or (x=5)
xcas mode and show vars in solutions on [✓]
solve((√(x^2-4*x+20)) = 5,x) returns [x=-1, x=5]
xcas mode and show vars in solutions off []
solve((√(x^2-4*x+20)) = 5,x) returns [-1,5]
Example 4:
cas mode and show vars in solutions on [✓]
solve([y=2*x,2*x^2=8],[x,y]) returns [[x=2,y=4],[x=-2,y=-4]]
Example 5:
xcas mode and show vars in solutions on [✓]
solve(y=2*x,[y,x]) returns [[y=2*x, x=x]]
solve(y=2*x,[x,y]) returns[[x=y/2, y=y]]
A new flag inspired by ti89 mode
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Re:
Run solve([x+y=2, 2x+2y=4],[x,y],'=')
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Re:
Ok, but because it returns set [...]
solve(y=2*x,[x,y],'=' ) returns set[[x=(y/2),y=y]]
solve([3x-2*y=1,2*x+3*y=18],[x,y],'=' ) returns set[[x=3,y=4]]
solve([y=2*x,2*x^2=8],[x,y],'=' ) returns set[[x=2,y=4],[x=-2,y=-4]]
What another parameter accepts in the third part?, for example it is important to see the output not as a list of objects but as a Boolean expression
solve([y=2*x,2*x^2=8],[x,y],'bool' ) => (x=2 and y=4) or (x=-2 and y=-4)
solve(y=2*x,[x,y],'=' ) returns set[[x=(y/2),y=y]]
solve([3x-2*y=1,2*x+3*y=18],[x,y],'=' ) returns set[[x=3,y=4]]
solve([y=2*x,2*x^2=8],[x,y],'=' ) returns set[[x=2,y=4],[x=-2,y=-4]]
What another parameter accepts in the third part?, for example it is important to see the output not as a list of objects but as a Boolean expression
solve([y=2*x,2*x^2=8],[x,y],'bool' ) => (x=2 and y=4) or (x=-2 and y=-4)
Re:
You have asked conversion functions that I have implemented, now please use them
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Re:
list2exp command is a programming instruction, not intuitive to be executed in the worksheet
list2exp(solve([y=2*x,2*x^2=8],[x,y]),[x,y]) returns (x=2 and y=4) or (x=-2 and y=-4)
Idea: Now, as the solutions return the variables solve([y=2*x,2*x^2=8],[x,y],'='), please optimize the list2exp command, that is, if the output contains variables, set[[x=2,y=4],[x=-2,y=-4]] conform the Boolean expression without the need to specify these variables
Example
current
: list2exp(solve([y=2*x,2*x^2=8],[x,y])) returns
"Error: Bad Argument Value" ok
: list2exp(solve([y=2*x,2*x^2=8],[x,y],'='),[x,y]) returns
(x=x=2) and y=y=4) or (x=x=-2) and (y=y=-4) =(
: list2exp(solve([y=2*x,2*x^2=8],[x,y],'='))
returns (x=2 and y=4) or (x=-2 and y=-4) =)
list2exp(solve([y=2*x,2*x^2=8],[x,y]),[x,y]) returns (x=2 and y=4) or (x=-2 and y=-4)
Idea: Now, as the solutions return the variables solve([y=2*x,2*x^2=8],[x,y],'='), please optimize the list2exp command, that is, if the output contains variables, set[[x=2,y=4],[x=-2,y=-4]] conform the Boolean expression without the need to specify these variables
Example
current
: list2exp(solve([y=2*x,2*x^2=8],[x,y])) returns
"Error: Bad Argument Value" ok
: list2exp(solve([y=2*x,2*x^2=8],[x,y],'='),[x,y]) returns
(x=x=2) and y=y=4) or (x=x=-2) and (y=y=-4) =(
: list2exp(solve([y=2*x,2*x^2=8],[x,y],'='))
returns (x=2 and y=4) or (x=-2 and y=-4) =)