The polynomial of degree 3, P(x), has a root of multiplicity 2 at x=1 and a root of multiplicity 1 at x=−5. The y-intercept is y=−3; Find a formula for P(x).
The polynomial of degree 3, P(x), has a root of multiplicity 2 at x=1 and a root of multiplicity 1 at x=−5. The y-interc...
The polynomial of degree 3, P(x), has a root of multiplicity 2 at5 and a root of multiplicity 1 at z3. The y- intercept is y37.5. Find a formula for P(z). P(x)- Preview Get help: Videc License Points possible: 1 Unlimited attempts. Submit Write an equation for the polynomial graphed below -2 -3 y(x)- Preview Get help: Video Points possible: 1 Unlimited attempts. Submit Search or type URL calculus Section 22 Spring 2019> Assessment Write an equation for the polynomial...
The polynomial of degree 4 The polynomial of degree 4, P(x) has a root of multiplicity 2 at x = 4 and roots of multiplicity 1 at x = 0 and x = – 2. It goes through the point (5, 7). Find a formula for P(x). P(x) =
The polynomial of degree 5, P(2) has leading coefficient 1, has roots of multiplicity 2 at I = 1 and I = 0, and a root of multiplicity 1 at I = - 3 Find a possible formula for P(x). P(x) = Question Help: Video Submit Question
Suppose that a polynomial function of degree 5 with rational coefficients has 0 (with multiplicity 2), 3, and 1 ?2i as zeros. Find the remaining zero.A. ?2B. ?1 ? 2iC. 0D. 1 + 2i
Form a polynomial whose zeros and degree are given. Zeros: 3, multiplicity 1; 1, multiplicity 2; degree 3 Type a polynomial with integer coefficients and a leading coefficient of 1 in the box below. f(x) = x2 - 7x² +21x – 18 (Simplify your answer.)
The polynomial function (x) with real coefficients has 4 as a zero with multiplicity 2; 1 as a zero with multiplicity 1 and its degree is 3. Then 1 (x) can be written as
Problem 2 (2 points): Sketch a cubic function (third degree polynomial function) y x = 1 and x 4 and a loc p(x) with two distinct zeros at al maximum at x 4. Then determine a formula for your function. [Hint you will have one double root.] Sketch: Formula: p(x)-
A polynomial function f(x) has a zero of 3 with multiplicity 2. (1)since the zero is 3, the graph crosses the y-axis at 3? (2) since the zero is 3, the graph goes up to the right? (3) since the multiplicity is 2, the graph crosses the x-axis? (4) since the multiplicity is 2, the graph touches but does not cross the x-axis? Please help me with this!!!
At the horizontal intercept x = -3, coming from the (x+3) factor of the polynomial, the graph passes directly through the horizontal intercept. The factor (x+3) is linear (has a power of 1), so the behavior near the intercept is like that of a line - it passes directly through the intercept. We call this a single zero, since the zero corresponds to a single factor of the function. At the horizontal intercept x = 2, coming from the (x...
Form a polynomial f(x) with real coefficients having the given degree and zeros. Degree 4; zeros: 5+5i; -2 multiplicity 2