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plural forms - Why is 00 called double zero, not double zeros . . . The problem with this answer is that "double zero" isn't often a mathematical expression Usually, if we say "double zero" we mean 00, which (in a phone number or reference number) usually can't be replaced with 0 - just as if we say "double two" we very often mean 22, not 4 –
singular vs plural - Double zero, double zeros or double zeroes . . . In this case, "double zero" is a singular noun referring to two zeros So you'd say: There's a double zero If you're referring to multiple zeros in plural, you'd use "zeros": There are two zeros Zeroes is a verb meaning to adjust to zero For example, taring a scale: I zeroed the scale He zeroes the scale
algebra precalculus - What is a double zero when I am trying to . . . Now, if we know that there is a double zero, like in your case $-1$, that means not only is $(x - (-1))$ a factor [which, if you simplify, equals $(x + 1)$] But actually, since $-1$ is a double zero, then $(x - (-1))^{2}$ is a factor of the polynomial So $(x - (-1))^{2}$, which equals $(x + 1)^{2}$, is a factor
meaning - Is zero pronounced as oh? - English Language Learners . . . But it’s perfectly fine to spell out the number 007 as zero-zero-seven, double-zero-seven, O-O-seven or double-O-seven Except that canonically, James Bond is always double-O-seven, never any of the others; but that’s a feature of the fiction, not English
Prove If a polynomial has a double zero, then after multiplying the . . . $\begingroup$ THANK YOU very much! Is there an explanation of why polynomials behave so nicely when the coefficients are multiplied to me in a scalar way $(a_0, ,a_n)*(b_0, ,b_n)$ or am i just reading too much in to this ? i will accept your answer in a day just to get a chance for someone to answer if you do not know $\endgroup$