Skip to main content
Evaluate
Tick mark Image
Factor
Tick mark Image

Similar Problems from Web Search

Share

\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\end{array}
First line up the numbers vertically and match the places from the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\end{array}
Now multiply the first number with the 1^{st} digit in 2^{nd} number to get intermediate results. That is Multiply 699 with 6. Write the result 4194 at the end leaving 0 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\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 699 with 2. Write the result 1398 at the end leaving 1 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\phantom{9}\\\phantom{\times999}1398\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 699 with 2. Write the result 1398 at the end leaving 2 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\phantom{9}\\\phantom{\times999}1398\phantom{99}\\\phantom{\times99}2097\phantom{999}\\\end{array}
Now multiply the first number with the 4^{th} digit in 2^{nd} number to get intermediate results. That is Multiply 699 with 3. Write the result 2097 at the end leaving 3 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\phantom{9}\\\phantom{\times999}1398\phantom{99}\\\phantom{\times99}2097\phantom{999}\\\phantom{\times9}2097\phantom{9999}\\\end{array}
Now multiply the first number with the 5^{th} digit in 2^{nd} number to get intermediate results. That is Multiply 699 with 3. Write the result 2097 at the end leaving 4 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\phantom{9}\\\phantom{\times999}1398\phantom{99}\\\phantom{\times99}2097\phantom{999}\\\phantom{\times9}2097\phantom{9999}\\\underline{\phantom{\times}3495\phantom{99999}}\\\end{array}
Now multiply the first number with the 6^{th} digit in 2^{nd} number to get intermediate results. That is Multiply 699 with 5. Write the result 3495 at the end leaving 5 spaces to the right like this.
\begin{array}{c}\phantom{\times999999}699\\\underline{\times\phantom{999}533226}\\\phantom{\times99999}4194\\\phantom{\times9999}1398\phantom{9}\\\phantom{\times999}1398\phantom{99}\\\phantom{\times99}2097\phantom{999}\\\phantom{\times9}2097\phantom{9999}\\\underline{\phantom{\times}3495\phantom{99999}}\\\phantom{\times}372724974\end{array}
Now add the intermediate results to get final answer.