 Hello and welcome to the session. In this session we discuss the following question which says what is the degree of the following differential equation given as 5x into dy by dx whole square minus d2y by dx2 minus 6y is equal to log x. Before we move on to the solution let's see what is the degree of a differential equation. We have degree of a differential equation is the highest power of the order derivative in it. This highest power is also a positive integer and also the degree is always a positive integer. This is the key idea that we use for this question. Let's proceed with the solution now. The given differential equation is 5x into by dx whole square minus dx2 minus 6y is equal to log x. We written as d2y you know that the degree of the differential equation is the highest power of the highest order derivative in the differential equation. So in this given differential equation we have that d2y by dx2 we know that the highest power of this highest order derivative is therefore we say that 1 is the degree of the given differential equation. Let's complete this session so we understood the solution of this question.