D. 64 iven that the two expression $$ (x+a)(x-15) $$ and $$ x^{2}+b x+75 $$ are identical calculate the value ib.

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We start with the identity
$$
(x+a)(x-15)= x^2 + bx + 75.
$$
First, expand the left‐hand side:
$$
(x+a)(x-15)= x^2 +(a-15)x -15a.
$$
Since the expressions are identical for all $$x$$, the coefficients of like powers must be equal. Therefore, we equate the coefficients from the expanded form to the given quadratic:

1. For the $$x^2$$ term:
$$
1=1.
$$

2. For the $$x$$ term:
$$
a-15=b.
$$

3. For the constant term:
$$
-15a=75.
$$

Now, solve for $$a$$ using the constant term equation:
$$
-15a=75 \quad \Longrightarrow \quad a=-5.
$$

Next, substitute $$a=-5$$ into the equation for $$b$$:
$$
b=a-15=-5-15=-20.
$$

Thus, the value of $$b$$ is $$-20$$.
The value of $$ b $$ is $$-20$$.

D. 64 iven that the two expression \( (x+a)(x-15) \) and \( x^{2}+b x+75 \) are identical calculate the value ib.

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