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Functions f and g are defined for all real

numbers. The function f has zeros at -2, 3, and 7:
and the function g has zeros at -3, -1, 4, and 7.
How many distinct zeros does the product
function f g have?

User Candrews
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1 Answer

15 votes
15 votes

9514 1404 393

Answer:

6

Explanation:

The number of distinct zeros in the product will be the union of the sets of zeros. Duplicated values are not distinct, so show in the union of sets only once.

F = {-2, 3, 7}

G = {-3, -1, 4, 7}

F∪G = {-3, -2, -1, 3, 4, 7} . . . . . . a 6-element set

The product has 6 distinct zeros.

_____

As you may notice in the graph, the duplicated zero has a multiplicity of 2 in the product.

Functions f and g are defined for all real numbers. The function f has zeros at -2, 3, and-example-1
User Akaedintov
by
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