Evaluate
12x_{150}
Differentiate w.r.t. x_150
12
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\begin{array}{c}\phantom{\times99}12\\\underline{\times\phantom{9}150}\\\end{array}
First line up the numbers vertically and match the places from the right like this.
\begin{array}{c}\phantom{\times99}12\\\underline{\times\phantom{9}150}\\\phantom{\times9999}0\\\end{array}
Now multiply the first number with the 1^{st} digit in 2^{nd} number to get intermediate results. That is Multiply 12 with 0. Write the result 0 at the end leaving 0 spaces to the right like this.
\begin{array}{c}\phantom{\times99}12\\\underline{\times\phantom{9}150}\\\phantom{\times9999}0\\\phantom{\times9}60\phantom{9}\\\end{array}
Now multiply the first number with the 2^{nd} digit in 2^{nd} number to get intermediate results. That is Multiply 12 with 5. Write the result 60 at the end leaving 1 spaces to the right like this.
\begin{array}{c}\phantom{\times99}12\\\underline{\times\phantom{9}150}\\\phantom{\times9999}0\\\phantom{\times9}60\phantom{9}\\\underline{\phantom{\times}12\phantom{99}}\\\end{array}
Now multiply the first number with the 3^{rd} digit in 2^{nd} number to get intermediate results. That is Multiply 12 with 1. Write the result 12 at the end leaving 2 spaces to the right like this.
\begin{array}{c}\phantom{\times99}12\\\underline{\times\phantom{9}150}\\\phantom{\times9999}0\\\phantom{\times9}60\phantom{9}\\\underline{\phantom{\times}12\phantom{99}}\\\phantom{\times}1800\end{array}
Now add the intermediate results to get final answer.
12x_{150}^{1-1}
The derivative of ax^{n} is nax^{n-1}.
12x_{150}^{0}
Subtract 1 from 1.
12\times 1
For any term t except 0, t^{0}=1.
12
For any term t, t\times 1=t and 1t=t.
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