(2n+7)<(n+3)proove it by mathematical induction.
Well... this is the third proof by induction question in a row.
Perhaps you would like to get at least step 1) done before I help you with step 2)
We would be happy to help you once you have tried the questions :)
Besides, I don't believe it :)
M nt getting 3rd step plz help me
To prove the inequality (2n+7) < (n+3) by mathematical induction, we need to follow these steps:
Step 1: Base Case
The base case involves substituting the smallest value of n into the inequality and verifying if it holds true.
Let's consider n = 1:
2(1) + 7 < 1 + 3
9 < 4
Since 9 is not less than 4, the inequality does not hold true for the base case. Therefore, we cannot proceed with further steps.
Hence, we cannot prove the inequality (2n+7) < (n+3) using mathematical induction.