yes there is , first u need to assume all ur premesis are true then after that u can find the truth value of each then u gonna go to the conclusion and insert the truth value that u got . if it yield true its valid if it yields false then its invalid.
That was really helpful, thanks to u!! but I couldn't understand neither the falsity of the 3rd row (the 1st example)🤔nor the whole second example especially with the final answer column. can someone plz explain that for me 😵
for the first example p, the third row of p is false, hence the conclusion will also be false, invalidating the entire argument. its same for the second example where the last row of g is false, so the conclusion g will also be false, invalidating the entire argument. for truth tables, if there is one row that is false, it invalidates everything even though there are rows wherein the conclusion is true. everything has to be true so that the entire argument can be valid. hope this helps!!
The second argument could be expressed like this g=> not r and not r therfore g then you could say that the structure of the argument is the same as in a hence argument b is invalid
Thank you alot I appreciate this video it had taken me alot of time to understand but when you worked it out I understood
Your way of teaching is incredible.
💯
This helps me a lot, our midterm is later na!! Thank you so much for this! ❤🎉
💯
Thank a lot sir but can you make a video of an example with valid argument
Super helpful 🎉
Thank you so much! I am cramming before my final tomorrow!
yes there is , first u need to assume all ur premesis are true then after that u can find the truth value of each then u gonna go to the conclusion and insert the truth value that u got . if it yield true its valid if it yields false then its invalid.
kuha ko na whhahahaha ty sir:)
Very useful
That was really helpful, thanks to u!!
but I couldn't understand neither the falsity of the 3rd row (the 1st example)🤔nor the whole second example especially with the final answer column. can someone plz explain that for me 😵
for the first example p, the third row of p is false, hence the conclusion will also be false, invalidating the entire argument. its same for the second example where the last row of g is false, so the conclusion g will also be false, invalidating the entire argument. for truth tables, if there is one row that is false, it invalidates everything even though there are rows wherein the conclusion is true. everything has to be true so that the entire argument can be valid. hope this helps!!
Thank you sir , you are a life saver ☺️
Short & clear👏👏👏
Sir
thank youu, it’s so helpfull
Check it is valid or invalid??
If the two sides of the triangle are equal then opposite angles are not equal .Therefore opposite angles are not equal
its invalid
It was helpful..
Is there a case that these arguments can be valid? Thankyouu
it was very helpful thanks
The second argument could be expressed like this g=> not r and not r therfore g then you could say that the structure of the argument is the same as in a hence argument b is invalid
what if i have for example 5 variables? do i need to write all 32 rows? is there a way to solve this without the truth table?
th-cam.com/video/AJe3ATDFIjQ/w-d-xo.html
Thnks a lot . 🙏
Thanks so much sir
Life saver🎉
THANK YOUUUUUU
Thank you sir!
Woooow thanks muuuchh
Thank bhai
Thanks Sir
ty
I thougnt ur supposed to explain not just solve the problem
In b) r- -> ~g should be False
It should be true.. A premise should be assumed to be true
mabuhay
god
Ga bisa bahasa engress