Question39. Let . When is divided by , the remainder is 30 . When is divided by , the quotient is . (a) Find the remainder when is divided by . xplain (b) How many real roots does the equation have? Explain your answer. Example 14
Studdy Solution
STEP 1
1. We have the polynomial .
2. When is divided by , the remainder is 30.
3. When is divided by , the quotient is .
4. We need to find the remainder when is divided by .
5. We need to determine how many real roots the equation has.
STEP 2
1. Use the Remainder Theorem to find conditions on the coefficients.
2. Use the given quotient information to find the remainder when dividing by .
3. Analyze the polynomial to determine the number of real roots.
STEP 3
Using the Remainder Theorem, substitute into to find the remainder:
Simplify:
STEP 4
Given that the quotient when is divided by is , we can express as:
where is the remainder, a linear polynomial since the divisor is quadratic:
STEP 5
Substitute and into to find and :
For :
For :
STEP 6
Since is the remainder when divided by , and the quotient is , we know:
Given the conditions, solve for and using the system of equations from Step 3.
STEP 7
Use the fact that has the remainder 30 when divided by to find the values of and .
Solve the system of equations to find and .
STEP 8
To determine the number of real roots of , analyze the polynomial and its factors.
STEP 9
Consider the degree of and the nature of its factors to determine the number of real roots.
The remainder when is divided by is , and the number of real roots of depends on the analysis of the polynomial's factors.
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