Is the predicate after the large amounts of nouns in the third person singular or plural

Is the predicate after the large amounts of nouns in the third person singular or plural

Large amounts of means a lot. The central word in it is mainly amounts, which is in the plural form, so the predicate verb should be in the plural form
Use the plural
What kind of of noun, singular or plural? Predicate verb singular or plural
What kind of of can be followed by singular or plural. It depends on the context. For example, if you want to know what kind of girls he likes, use plural. If you only want to know one kind, use singular. There is no strict restriction. What kind of girls do you like? There are also
Odd function does not contain odd term or odd term, even function does not contain even term or even term
In polynomial functions,
(1) Odd function does not contain even degree term and constant term, such as f (x) = x & # 179; + X;
(2) Even functions do not contain odd terms, such as G (x) = x & # 8308; + X & # 178; + 1
Otherwise, it is not odd or even, such as f (x) = x & # 178; + X + 1
Odd function does not contain even degree term, even function does not contain odd degree term
Do you doubt the definition of the textbook or do you doubt the topic? It's not very logical, or odd function does not contain odd term, even function does not contain even term.
For example, f (x) = x is an odd function with odd terms, but f (x) = x + 1 is not an odd function.
F (x) = x & # 178; is even function with even degree term, but f (x) = x & # 178; + 2 is even function. And f (x) = (x + 2) &# 178; = x & # 178; + 2x + 4 is not even function... Expansion
Do you doubt the definition of the textbook or do you doubt the topic? It's not very logical, or odd function does not contain odd term, even function does not contain even term.
For example, f (x) = x is an odd function with odd terms, but f (x) = x + 1 is not an odd function.
F (x) = x & # 178; is even function with even degree term, but f (x) = x & # 178; + 2 is even function. And f (x) = (x + 2) &# 178; = x & # 178; + 2x + 4 is not even function
Odd function does not contain even term, even function does not contain odd term, odd function and even function have nothing to do with the number of terms
Odd function and even function can contain these, as long as satisfy - f (x) = f (- x), this function is odd function; satisfy f (x) = f (- x), this function is even function.
Plural of life
What is the plural of life?
The plural of life is lives
On monotonicity of functions
The function defined on R is y = f (x). F (0) is not equal to 0. When x is greater than 0, f (x) is greater than 1, and any a and B belong to R. it is proved that f (a + b) = f (a) × f (b) (1). It is proved that f (x) is an increasing function of R for any x-constant f (x) greater than 0 (2). If f (x) · f (2x-x & sup2;) > 1, the value range of X is obtained
(1) F (a + b) = f (a) × f (b), let a and B be 0. The solution is f (0) = 1
Let B = - A and substitute f (a + b) = f (a) × f (b) to get f (a) * f (- a) = 1
That is, f (a) and f (- a) are reciprocal. Let a be greater than 0, that is, f (a) be greater than 1
So f (- a) = 1 / F (a) is greater than 0 and less than 1. So for X belongs to R, f (x) is greater than 0
(2) If f (x) is an increasing function on R, let a be greater than B, i.e. [f (b) / F (a)] be less than 1
So f (a + b) / F (a) = f (b), substituting into the formula, f (a + b) is less than f (a) × f (a)
So f (x) is an increasing function in R
(3) According to f (a + b) = f (a) × f (b), f (3x-x ^ 2) is greater than 1
Because when x is greater than 0, f (x) is greater than 1. So only 3x-x ^ 2 is greater than 0
The results show that x belongs to (0,3)
(1) Certification:
f(x+0)=f(x)*f(0)
F (0) = 1, or for all x, f (x) = 0
F (x) = f (x / 2 + X / 2) = [f (x / 2)] ^ 2 > 0 (because f (x / 2) is not equal to 0, which has been proved above),
So f (x) is greater than 0
(2) If any two numbers X1 and X2 satisfy x2 > x1, then x2 = X1 + K (k > 0)
There is... Unfolding
(1) Certification:
f(x+0)=f(x)*f(0)
F (0) = 1, or for all x, f (x) = 0
F (x) = f (x / 2 + X / 2) = [f (x / 2)] ^ 2 > 0 (because f (x / 2) is not equal to 0, which has been proved above),
So f (x) is greater than 0
(2) If any two numbers X1 and X2 satisfy x2 > x1, then x2 = X1 + K (k > 0)
There are
f(x2)=f(x1+k)
From the conditional formula,
f(x2)=f(x1+k)
=f(x1)f(k)
From the title x > 0, f (x) > 1
Know that f (k) > 1
So f (x2) = f (x1) f (k) > 1 * f (x1) = f (x1)
For any x 2 > x 1, f (x 2) > F (x 1) holds, so f (x) is an increasing function on R.
（3）f（x）·f（2x－x²）
=f[x+（2x－x²）]＞1=f(0)
Then f (x) is an increasing function in R
We get x + 2x - X & # 178; > 0
x^2-3x0
Therefore, f (x) > 0 holds on R
2) Let C belong to R and C > 0, f (x + C) - f (x) = f (x) * f (c) - f (x) = f (x) [f (c) - 1],
(where x is any value)
Because f (x) > 0, and
1) Let a = 0, then f (b) = f (0) * f (b) -- > F (0) = 1
Let a > 0, B = - A, then f (0) = f (a) * f (- a) = 1, f (- a) = 1 / F (a) > 0
Therefore, f (x) > 0 holds on R
2) Let C belong to R and C > 0, f (x + C) - f (x) = f (x) * f (c) - f (x) = f (x) [f (c) - 1],
(where x is any value)
Because f (x) > 0 and f (c) > 1, f (x + C) - f (x) > 0 is constant, that is, f (x) is increasing
3）f(x)*f(2x-x^2)=f(x+2x-x^2)>1
---X + 2x-x ^ 2 > 0, solve the inequality
Plural of life
Why do you want to change like this
lives
f--ves
Remember this is grammar
lives
F clear consonant becomes V
It is known that the function y = f (x) is an odd function on R, and when x > 0, f (x) = 1. Try to find the expression of the function f = (x)
x> 0, f (x) = 1
That is, y = 1
From the odd function, we know that X
Noun plural rule list table
In general, add - S 1. Clear consonants after reading / S /; map maps 2. Voiced consonants and vowels after bag bags reading / Z /; car cars with s, SH, CH, X and other words end with - es reading / iz / bus
Define mathematical even function
f(x)=f(-x)
Then when f (x + 2) is an even function
F (x + 2) = f (- x + 2) or F (- X-2)
The odd even function is for the independent variable x, f (x + 2) = f (- x + 2)
f(-x+2)
Remember that the horizontal axis of odd and even functions is X
f(x+2)=f(-x+2)
f(x+2)=f(-x+2)
What are the common nouns with the same number in English?
How many can you say
Nouns with the same singular and plural are:
Chinese -- Chinese
Deer -- deer deer
German -- German
Sheep -- sheep
Japanese -- Japanese
Means -- means method
Swiss -- Swiss
Series -- Series
fish,sheep,
fish,sheep,Chinese,Japanese