给定表示多项式的字符串str和数字N ,任务是在给定值N处对X积分该多项式。
例子:
Input: str = “90x4 + 24x3 + 18x2 + 18x”, N = 1.
Output: 39
Explanation:
Given, dy/dx = 90*(X4) + 24* (X3) + 18* (X2) + 18*(X). On integrating this equation, we get 18*(X5) + 6*(X4) + 6*(X3) + 9*(X2) and substituting the value X = 1, we get:
18 + 6 + 6 + 9 = 39.
Input: str = “4x3 + 2x2 + 3x”, N = 2
Output: 27
方法:想法是使用集成的身份。对于某个给定的函数X,其幂为 N,该项的积分由下式给出:
因此,按照以下步骤计算答案:
- 获取字符串。
- 拆分字符串并根据上述公式进行积分。
- 代入得到的表达式中的 N 值。
- 将所有单个值相加以获得最终的积分值。
下面是上述方法的实现:
C++
// C++ program to find the integration
// of the given polynomial for the
// value N
#include
using namespace std;
typedef long long ll;
// Function to return the integral
// of the given term
double inteTerm(string pTerm, ll val)
{
// Get the coefficient
string coeffStr = "";
int i;
// Loop to iterate through the string
// and get the coefficient
for (i = 0; pTerm[i] != 'x'; i++)
coeffStr.push_back(pTerm[i]);
ll coeff = atol(coeffStr.c_str());
// Get the Power
string powStr = "";
// Loop to skip 2 characters for x and ^
for (i = i + 2; i != pTerm.size(); i++)
powStr.push_back(pTerm[i]);
ll power = atol(powStr.c_str());
// Return the computed integral
return (coeff * pow(val, power + 1))
/ (power + 1);
}
// Functionto find the integration
// of the given polynomial for the
// value N
double integrationVal(string poly, int val)
{
ll ans = 0;
// Using string stream to get the
// input in tokens
istringstream is(poly);
string pTerm;
while (is >> pTerm) {
// If the token is equal to '+' then
// continue with the string
if (pTerm == "+")
continue;
// Otherwise find the integration
// of that particular term
else
ans = (ans + inteTerm(pTerm, val));
}
return ans;
}
// Driver code
int main()
{
string str = "4x^3 + 3x^1 + 2x^2";
int val = 2;
cout << integrationVal(str, val);
return 0;
}
Java
// Java program for the above approach
public class GFG
{
// Function to return the integral
// of the given term
static int inteTerm(String pTerm, int val)
{
// Get the coefficient
String coeffStr = "";
// Loop to iterate through
// the string and get the
// coefficient
int i = 0;
while (i < pTerm.length() && pTerm.charAt(i) != 'x')
{
coeffStr += pTerm.charAt(i);
i += 1;
}
int coeff = Integer.parseInt(coeffStr);
// Get the Power
String powStr = "";
// Loop to skip 2 characters
// for x and ^
int j = i + 2;
while(j< pTerm.length())
{
powStr += (pTerm.charAt(j));
j += 1;
}
int power = Integer.parseInt(powStr);
// Return the computed integral
return ((coeff * (int)Math.pow(val, power + 1)) / (power + 1));
}
// Functionto find the integration
// of the given polynomial for the
// value N
static int integrationVal(String poly, int val)
{
int ans = 0;
// Using string stream to
// get the input in tokens
String[] stSplit = poly.split(" \\+ ");
int i = 0;
while(i < stSplit.length)
{
ans = (ans + inteTerm(stSplit[i], val));
i += 1;
}
return ans;
}
// Driver code
public static void main(String[] args) {
String st = "4x^3 + 3x^1 + 2x^2";
int val = 2;
System.out.println(integrationVal(st, val));
}
}
// This code is contributed by divyesh072019.
Python3
# Python3 program to find
# the integration of the
# given polynomial for the
# value N
# Function to return the integral
# of the given term
def inteTerm(pTerm, val):
# Get the coefficient
coeffStr = ""
# Loop to iterate through
# the string and get the
# coefficient
i = 0
while (i < len(pTerm) and
pTerm[i] != 'x'):
coeffStr += pTerm[i]
i += 1
coeff = int(coeffStr)
# Get the Power
powStr = ""
# Loop to skip 2 characters
# for x and ^
j = i + 2
while j< len(pTerm):
powStr += (pTerm[j])
j += 1
power = int(powStr)
# Return the computed integral
return ((coeff *
pow(val,
power + 1)) //
(power + 1))
# Functionto find the integration
# of the given polynomial for the
# value N
def integrationVal(poly, val):
ans = 0
# Using string stream to
# get the input in tokens
stSplit = poly.split("+")
i = 0
while i < len(stSplit):
ans = (ans +
inteTerm(stSplit[i],
val))
i += 1
return ans
# Driver code
if __name__ == "__main__":
st = "4x^3 + 3x^1 + 2x^2"
val = 2
print(integrationVal(st, val))
# This code is contributed by Chitranayal
C#
// C# program for the above approach
using System;
using System.Collections.Generic;
class GFG {
// Function to return the integral
// of the given term
static int inteTerm(string pTerm, int val)
{
// Get the coefficient
string coeffStr = "";
// Loop to iterate through
// the string and get the
// coefficient
int i = 0;
while (i < pTerm.Length && pTerm[i] != 'x')
{
coeffStr += pTerm[i];
i += 1;
}
int coeff = Convert.ToInt32(coeffStr);
// Get the Power
string powStr = "";
// Loop to skip 2 characters
// for x and ^
int j = i + 2;
while(j< pTerm.Length)
{
powStr += (pTerm[j]);
j += 1;
}
int power = Convert.ToInt32(powStr);
// Return the computed integral
return ((coeff * (int)Math.Pow(val, power + 1)) / (power + 1));
}
// Functionto find the integration
// of the given polynomial for the
// value N
static int integrationVal(string poly, int val)
{
int ans = 0;
// Using string stream to
// get the input in tokens
string[] stSplit = poly.Split('+');
int i = 0;
while(i < stSplit.Length)
{
ans = (ans + inteTerm(stSplit[i], val));
i += 1;
}
return ans;
}
// Driver code
static void Main() {
string st = "4x^3 + 3x^1 + 2x^2";
int val = 2;
Console.WriteLine(integrationVal(st, val));
}
}
// This code is contributed by divyeshrabadiya07.
Javascript
输出:
27