gaokao

Papers (66)

2025

national-I 19 national-II 18 national-I_eol 19

2024

beijing 21 national-II 19 national-I_github 19

2023

national-A-science 18 national-B-science 16 national-II 8

2022

national-A-arts 15 national-A-science 14 national-B-arts 20 national-B-science 17 national-I 19 national-II 7

2021

national-A-arts 19 national-A-science 18 national-I 14 national-II 12

2020

national-I-arts 20 national-I-science 9 national-II-science 17 national-III-arts 22 national-III-science 16 shanghai 17

2019

beijing-science 15 national-I-arts 13 national-I-science 12 national-I-science_gkztc 14 national-II-arts 13 national-II-science 9 national-II-science_gkztc 13 national-III-arts 14 national-III-science 16 national-III-science_gkztc 14

2018

national-I-arts 14 national-I-science 13 national-II-arts 20 national-II-science 18 national-III-science 17

2017

national-I-arts 13 national-I-science 14 national-II-arts 15 national-II-science 8

2016

national-I 7

2015

anhui-arts 14 beijing-arts 15 beijing-science 13 chongqing-arts 20 chongqing-science 15 fujian-science 18 hubei-arts 16 hubei-science 15 hunan-arts 21 hunan-science 11 jiangsu 19 national-II-arts 15 national-II-science 16 shaanxi-science 17 sichuan-arts 15 sichuan-science 21 tianjin-arts 17 tianjin-science 17 zhejiang-arts 15 zhejiang-science 15

Unknown

sample_questions 7

2025 national-I_eol

19 maths questions

Q1 5 marks Complex Numbers Arithmetic Identifying Real/Imaginary Parts or Components View

The imaginary part of $(1 + 5i)i$ is
A. $-1$
B. $0$
C. $1$
D. $6$

Q2 5 marks Probability Definitions Set Operations View

Let the universal set $U = \{1,2,3,4,5,6,7,8\}$, and set $A = \{1,3,5\}$. The number of elements in $C_U A$ is
A. $0$
B. $3$
C. $5$
D. $8$

Q3 5 marks Conic sections Eccentricity or Asymptote Computation View

If the imaginary axis length of hyperbola $C$ is $\sqrt{7}$ times the real axis length, then the eccentricity of $C$ is
A. $\sqrt{2}$
B. $2$
C. $\sqrt{7}$
D. $2\sqrt{2}$

Q4 5 marks Trig Graphs & Exact Values View

If the point $(a, 0)$ $(a > 0)$ is a center of symmetry of the graph of the function $y = 2\tan\left(x - \frac{\pi}{3}\right)$, then the minimum value of $a$ is
A. $\frac{\pi}{6}$
B. $\frac{\pi}{3}$
C. $\frac{\pi}{2}$
D. $\frac{4\pi}{3}$

Q5 5 marks Function Transformations View

Let $f(x)$ be an even function defined on $\mathbf{R}$ with period 2. When $2 \leq x \leq 3$, $f(x) = 5 - 2x$. Then $f\left(-\frac{3}{4}\right) =$
A. $-\frac{1}{2}$
B. $-\frac{1}{4}$
C. $\frac{1}{4}$
D. $\frac{1}{2}$

Q6 5 marks Vectors Introduction & 2D Vector Word Problem / Physical Application View

In sailing competitions, athletes can use anemometers to measure wind speed and direction. The measured result is called apparent wind speed in nautical science. The vector corresponding to apparent wind speed is the sum of the vector corresponding to true wind speed and the vector corresponding to ship's wind speed, where the vector corresponding to ship's wind speed has the same magnitude as the vector corresponding to ship's speed but opposite direction. Figure 1 shows the correspondence between part of the wind force levels, names, and wind speeds. A sailor measured the vectors corresponding to apparent wind speed and ship's speed at a certain moment as shown in Figure 2 (the magnitude of wind speed and the magnitude of the vector are the same, unit: m/s). Then the true wind is

Level	Wind Speed	Name
2	$1.1 \sim 3.3$	Light breeze
3	$3.4 \sim 5.4$	Gentle breeze
4	$5.5 \sim 7.9$	Moderate breeze
5	$8.0 \sim 10.1$	Fresh breeze

A. Light breeze
B. Gentle breeze
C. Moderate breeze
D. Fresh breeze

Q7 5 marks Circles Circle-Line Intersection and Point Conditions View

If the circle $x^2 + (y+2)^2 = r^2$ $(r > 0)$ has exactly 2 points at distance 1 from the line $y = \sqrt{3}x + 2$, then the range of $r$ is
A. $(0,1)$
B. $(1,3)$
C. $(3, +\infty)$
D. $(0, +\infty)$

Q8 5 marks Exponential Equations & Modelling Properties of Logarithmic Functions and Statement Verification View

If real numbers $x, y, z$ satisfy $2 + \log_2 x = 3 + \log_3 y = 5 + \log_5 z$, then the size relationship of $x, y, z$ that is impossible is
A. $x > y > z$
B. $x > z > y$
C. $y > x > z$
D. $y > z > x$

Q9 6 marks Vectors: Lines & Planes MCQ: Identify Correct Equation or Representation View

In the right triangular prism $ABC - A_1B_1C_1$, let $D$ be the midpoint of $BC$. Then
A. $AD \perp A_1C$
B. $BC \perp$ plane $AA_1D$
C. $AD \parallel A_1B_1$
D. $CC_1 \parallel$ plane $AA_1D$

Q10 6 marks Conic sections Focal Chord and Parabola Segment Relations View

Let the focus of parabola $C: y^2 = 6x$ be $F$. A line through $F$ intersects $C$ at $A$ and $B$. A perpendicular from $A$ to the line $l: x = -\frac{3}{2}$ meets it at $D$. A line through $F$ perpendicular to $AB$ meets $l$ at $E$. Then
A. $|AD| = |AF|$
B. $|AE| = |AB|$
C. $|AB| \geq 6$
D. $|AE| \cdot |BE| \geq 18$

Q11 6 marks Sine and Cosine Rules Determine an angle or side from a trigonometric identity/equation View

Given that the area of $\triangle ABC$ is $\frac{1}{4}$, if $\cos 2A + \cos 2B + 2\sin C = 2$, $\cos A \cos B \sin C = \frac{1}{4}$, then
A. $\sin C = \sin^2 A + \sin^2 B$
B. $AB = \sqrt{2}$
C. $\sin A + \sin B = \frac{\sqrt{6}}{2}$
D. $AC^2 + BC^2 = 3$

Q12 5 marks Tangents, normals and gradients Determine unknown parameters from tangent conditions View

If the line $y = 2x + 5$ is tangent to the curve $y = e^x + x + a$, then $a = $ $\_\_\_\_$ .

Q13 5 marks Geometric Sequences and Series Finite Geometric Sum and Term Relationships View

If the sum of the first 4 terms of a geometric sequence is 4 and the sum of the first 8 terms is 68, then the common ratio of the geometric sequence is $\_\_\_\_$ .

Q14 5 marks Discrete Random Variables Expectation and Variance via Combinatorial Counting View

A box contains 5 balls labeled $1$ to $5$. If we draw with replacement three times, let $X$ denote the number of distinct balls drawn at least once. Then $E(X) = $ $\_\_\_\_$ .

Q15 13 marks Chi-squared test of independence View

(13 points) To study the relationship between a certain disease and ultrasound examination results, 1000 people who had undergone ultrasound examination were randomly surveyed, yielding the following contingency table:

	Normal	Abnormal	Total
Has disease	20	180	200
Does not have disease	780	20	800
Total	800	200	1000

(1) Let $p$ denote the probability that a person with abnormal ultrasound examination results has the disease. Find the estimated value of $p$.
(2) Based on the significance level $\alpha = 0.001$ for the independence test, analyze whether the ultrasound examination result is related to having the disease. Attachment: $\chi^2 = \frac{n(ad - bc)^2}{(a+b)(c+d)(a+c)(b+d)}$,

$P(\chi^2 \geq k)$	0.050	0.010	0.001
$k$	3.841	6.635	10.828

Q16 15 marks Arithmetic Sequences and Series Prove a Sequence is Arithmetic View

(15 points) Let the sequence $\{a_n\}$ satisfy $a_1 = 3$, $\frac{a_{n+1}}{n} = \frac{a_n}{n+1} + \frac{1}{n(n+1)}$.
(1) Prove that $\{na_n\}$ is an arithmetic sequence.
(2) Let $f(x) = a_1 x + a_2 x^2 + \cdots + a_m x^m$. Find $f'(-2)$.

Q17 15 marks Vectors: Lines & Planes Multi-Step Geometric Modeling Problem View

(15 points) In the quadrangular pyramid $P - ABCD$, $PA \perp$ plane $ABCD$, $BC \parallel AD$, $AB \perp AD$.
(1) Prove that plane $PAB \perp$ plane $PAD$.
(2) If $PA = AB = \sqrt{2}$, $AD = \sqrt{3} + 1$, $BC = 2$, and $P, B, C, D$ lie on the same sphere with center $O$.
(i) Prove that $O$ lies on plane $ABCD$.
(ii) Find the cosine of the angle between line $AC$ and line $PO$.

Q18 17 marks Conic sections Optimization on Conics View

(17 points) Given the ellipse $C: \frac{x^2}{a^2} + \frac{y^2}{b^2} = 1$ $(a > b > 0)$ with eccentricity $\frac{2\sqrt{2}}{3}$, lower vertex $A$, right vertex $B$, and $|AB| = \sqrt{10}$.
(1) Find the equation of $C$.
(2) Let $P$ be a moving point not on the $y$-axis, and let $R$ be a point on the ray $AP$ satisfying $|AP| \cdot |AR| = 3$.
(i) If $P(m, n)$, find the coordinates of $R$ (expressed in terms of $m, n$).
(ii) Let $O$ be the origin, and $Q$ be a moving point on $C$. The slope of line $OR$ is 3 times the slope of line $OP$. Find the maximum value of $|PQ|$.

Q19 17 marks Trig Proofs Extremal Value of Trigonometric Expression View

(17 points)
(1) Find the maximum value of the function $f(x) = 5\cos x - \cos 5x$ on the interval $\left[0, \frac{\pi}{4}\right]$.
(2) Given $\theta \in (0, \pi)$ and $a \in \mathbf{R}$, prove that there exists $y \in [a - \theta, a + \theta]$ such that $\cos y \leq \cos \theta$.
(3) Let $b \in \mathbf{R}$. If there exists $\varphi \in \mathbf{R}$ such that $5\cos x - \cos(5x + \varphi) \leq b$ holds for all $x \in \mathbf{R}$, find the minimum value of $b$.