Operations with polynomials — Basic example | Math | SAT | Khan Academy
Summary
TLDRIn the transcript, the instructor simplifies a complex mathematical expression involving powers of y. Starting with 1/88 or one over 88, the expression is expanded to include y to the 100th power plus one, then subtracting 1/44 y to the 100th minus 1/2. By distributing the negative sign and combining like terms, the instructor simplifies the expression to negative one-eighth y to the 100th plus three halves, demonstrating a clear step-by-step process to reach the simplified form.
Takeaways
- 🔢 The original expression is equivalent to \( \frac{1}{88} \) or \( \frac{1}{88}y^{100} + 1 \).
- 📝 The expression is rewritten to subtract \( \frac{1}{44}y^{100} - \frac{1}{2} \) from \( \frac{1}{88}y \).
- 🔍 Negative signs are distributed to simplify the expression.
- ➖ The terms \( \frac{1}{88}y^{100} \) and \( -\frac{1}{44}y^{100} \) are combined.
- ➕ The expression \( -\frac{1}{2} \) is converted to \( +\frac{1}{2} \) after distribution.
- 🧩 The combined terms are simplified to \( \frac{1}{88}y^{100} - \frac{1}{44}y^{100} \) and \( +\frac{3}{2} \).
- 📉 The common denominator of \( \frac{1}{88} \) and \( \frac{1}{44} \) is found to be 88.
- 🔄 The fraction \( \frac{1}{44} \) is converted to \( \frac{2}{88} \) to match the common denominator.
- 📌 The simplified expression becomes \( -\frac{1}{88}y^{100} + \frac{3}{2} \).
- 🔚 The final simplified form of the expression is \( -\frac{1}{88}y^{100} + \frac{3}{2} \).
Q & A
What is the original expression the instructor is trying to simplify?
-The original expression is 1/88 y to the 100th power plus 1, minus (1/44 y to the 100th minus 1/2).
What is the first step the instructor takes to simplify the expression?
-The first step is to rewrite the expression and distribute the negative sign across the terms within the parentheses.
How does the instructor represent the negative distribution of the terms?
-The instructor represents it as -1 times each term inside the parentheses, which results in -1/44 y to the 100th and +1/2.
What is the next step after distributing the negative sign?
-The next step is to combine like terms, specifically the terms involving y to the 100th power.
What is the common denominator used to combine the terms involving y to the 100th power?
-The common denominator used is 88, which is the least common multiple of 44 and 88.
How does the instructor simplify 1/88 minus 1/44?
-The instructor simplifies it by recognizing that 2/88 is equivalent to 1/44, and thus 1/88 minus 2/88 equals -1/88.
What is the final simplified form of the original expression according to the instructor?
-The final simplified form is -1/88 y to the 100th plus 3/2.
What mathematical property does the instructor use to combine the fractions 1/88 and 1/44?
-The instructor uses the property of finding a common denominator to combine the fractions.
How does the instructor handle the term 'plus 1/2' after distributing the negative sign?
-The instructor correctly keeps the 'plus 1/2' term as it is, as it is not affected by the negative distribution.
What is the significance of the term 'plus 3/2' in the final simplified expression?
-The term 'plus 3/2' is the result of adding 1 and 1/2, which simplifies to 3/2, and it is a constant term in the expression.
Can the expression be further simplified after the instructor's final step?
-No, the expression has been simplified to its most basic form, with the variable term and the constant term separated.
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