Evaluate The Logarithmic Equation For 3 Values Of X Greater Than -1 3 Between -2&-1 &x=-1 Y = Ln(x + 2)
Y = Ln(x + 2) ,x=3,y=1.6,1.6>-1.
X=-1,y=0.
To evaluate the logarithmic equation for different values of x, we can substitute the given x-values into the equation and calculate the corresponding y-values.
1. Let's begin by substituting x = 3 into the equation:
Y = Ln(x + 2)
Y = Ln(3 + 2)
Y = Ln(5)
Using a calculator or a logarithm table, we can find that Ln(5) is approximately equal to 1.6094. So, for x = 3, y = 1.6094.
2. Now, let's substitute x = 1.6 into the equation:
Y = Ln(x + 2)
Y = Ln(1.6 + 2)
Y = Ln(3.6)
Using a calculator or a logarithm table, we can find that Ln(3.6) is approximately equal to 1.2809. So, for x = 1.6, y = 1.2809.
3. Finally, let's substitute x = -1 into the equation:
Y = Ln(x + 2)
Y = Ln(-1 + 2)
Y = Ln(1)
The natural logarithm of 1 is 0. So, for x = -1, y = 0.
Therefore, for the given values of x, the corresponding values of y are:
x = 3, y = 1.6094
x = 1.6, y = 1.2809
x = -1, y = 0.