Extensions of the natural approach to refinements and generalizations of some trigonometric inequalities

In this paper we propose a new method for sharpening and refinements of some trigonometric inequalities. We apply these ideas to some inequalities of Wilker–Cusa–Huygens type.

Inequalities involving trigonometric functions are used in many applications in various fields of mathematics such as difference equations and inequalities [1], theory of stability, theory of approximations, etc. A method called the natural approach, proposed by Mortici in [2], uses the idea of comparing functions to their corresponding Taylor polynomials. This method has been successfully applied to prove and approximate a wide category of trigonometric inequalities [3, 4].

In this paper we extend the ideas of the natural approach by comparing and replacing functions with their corresponding power series. In particular, we focus on the results of Mortici in [2] related to Wilker–Cusa–Huygens’s inequalities and give generalizations and refinements of the inequalities stated in Theorems 1, 2, 3, 4, 5, and 6 in that paper. They are cited below.

Statement 1

([2], Theorem 1)

For every \(0< x<\pi /2\), we have

Statement 2

([2], Theorem 2)

For every \(0< x<\pi /2\), we have

Statement 3

([2], Theorem 3)

For every \(0< x<\pi /2\), we have

Statement 4

([2], Theorem 4)

For every \(0< x<\pi /2\), we have

Statement 5

([2], Theorem 5)

For every \(0< x<\pi /2\), we have

Statement 6

([2], Theorem 6)

For every \(0< x<\pi /2\), we have

First, let us recall some of the well-known power series expansions that will be used in our proofs.

For \(x \in R\), the following power series expansions hold:

Also, according to [5], for \(x \in R\), we have the following power series expansions:

and

For \(x \in (0,\frac{\pi }{2} )\), according to [5], the following series expansions hold:

and

where \(\boldsymbol{B}_{i}\) are Bernoulli’s numbers.

Theorem WD

([6], Theorem 2)

Suppose that \(f(x)\) is a real function on \((a,b)\), and that n is a positive integer such that \(f ^{(k)}(a+)\), \(f^{(k)}(b-)\) (\(k \in \{0,1,2, \ldots ,n\} \)) exist.

1. (i)

   Supposing that \((-1)^{(n)} f^{(n)}(x)\) is increasing on \((a,b)\), then for all \(x \in (a,b)\) the following inequality holds:

   $$\begin{aligned} &\sum_{k=0}^{n-1} \frac{f^{(k)}(b - )}{k!} (x-b)^{k}+ \frac{1}{(a-b)^{n}} \Biggl( f(a + ) - \sum _{k=0}^{n-1}\frac{(a-b)^{k}f^{(k)}(b - )}{k!} \Biggr) (x-b)^{n} \\ &\quad < f(x)< \sum_{k=0}^{n}{ \frac{f^{(k)}(b - )}{k!}(x-b)^{k}}. \end{aligned}$$

   (7)

   Furthermore, if \((-1)^{n} f^{(n)}(x)\) is decreasing on \((a,b)\), then the reversed inequality of (7) holds.

2. (ii)

   Supposing that \(f^{(n)}(x)\) is increasing on \((a,b)\), then for all \(x \in (a,b)\) the following inequality holds:

   $$\begin{aligned} &\sum_{k=0}^{n-1} \frac{f^{(k)}(a+ )}{k!} (x-a)^{k}+\frac{1}{(b-a)^{n}} \Biggl(f(b-)-\sum _{k=0}^{n-1}\frac{(b-a)^{k} f^{(k)}(a +)}{k!}\Biggr) (x-a)^{n} \\ &\quad >f(x)>\sum_{k=0}^{n} \frac{f^{(k)}(a + )}{k!}(x-a)^{k}. \end{aligned}$$

   (8)

Furthermore, if \(f^{(n)}(x)\) is decreasing on \((a,b)\), then the reversed inequality of (8) holds.

Let us mention that an interesting application of Theorem WD is given in [7], see also [8].

We need the following theorem for the proofs of Theorems 1, 2, 3, and 4.

Proposition 1

Let the series \(f(x)= \sum_{k=1}^{\infty }(-1)^{k+1} A(k) x^{2k}\) converge for \(x \in (0,c)\), \(c \in R^{+} \). Suppose that the following statements are true:

1. (i)

   If \(c < 1\), then the sequence \(\{ A(k) \} _{k \in N}\) is a positive decreasing sequence that converges to 0.

2. (ii)

   If \(c \geq 1\), then the sequence \(\{ A(k) \} _{k \in N}\) is a positive sequence, \(\lim_{k\rightarrow +\infty } c^{2k}A(k) = 0\) and \(A(k) > c^{2} A(k+1)\) for \(k \geq 1\).

Then, for all \(x \in (0, c)\) and for all \(n \in N\) and \(m \in N\), we have

and

Proof

Suppose that \(c < 1\). Then, for every \(x \in (0,c)\), the positive sequence \(\{ A(k) x^{2k} \} _{k \in N}\) decreases monotonically and \(\lim_{k\rightarrow \infty } A(k) x^{2k} =0\). Thus, assertions (9) and (10) immediately follow from Leibniz’s theorem for the alternating series.

Suppose now that \(c \geq 1\). We have

Let us introduce the substitution \(t = \frac{x}{c}\) in the previous power series and consider the series

For the assumption \(A(k) > c^{2}A(k+1)\), we have

Hence, we conclude that for every \(t \in (0,1)\) power series (11) satisfies Leibniz’s theorem for the alternating series, and for all \(n, m \in N\) we have

and

Returning the variable \(x= t c\) to (12) and (13) gives the assertions of proposition. □

3.1 Refinements of the inequalities in Statement 1

We propose the following improvement and generalization of Statement 1.

Theorem 1

1. (i)

   For every \(x \in ( 0, \frac{\pi}{2})\) and every \(n \in N\), we have

   $$ \sum_{k=2}^{2n} (-1)^{k} A(k) x^{2k}< \cos x - \biggl(\frac{\sin x}{x} \biggr) ^{ 3}< \sum_{k=2}^{2n+1}(-1)^{k} A(k) x^{2k}, $$

   (14)

   where

   $$ A(k) = \frac{3^{2k+3}-32k^{3}-96k^{2}-88k-27}{4(2k+3)!}. $$
2. (ii)

   For every \(x \in ( 0, \frac{\pi }{2})\) and every \(m \in N\), we have the following error estimation:

   $$ \Biggl\vert \cos x- \biggl(\frac{\sin x}{x} \biggr) ^{ 3}-\sum _{k=1}^{m}{(-1)^{k}A(k) x^{2k}} \Biggr\vert < A(m+1) x^{2m+2}. $$

   (15)

Examples

Let \(x\in( 0, \frac{\pi }{2}) \).

For \(n=1\), we get Statement 1.

For \(n>1\), we have the following new results:

• Taking \(n=2\) in (14) gives

  $$\begin{aligned} \frac{1}{15}x^{4} + \frac{23}{1890}x^{6} - \frac{41}{37\text{,}800}x^{8}& < \cos x - \biggl(\frac{\sin x}{x}\biggr) ^{3} \\ &< - \frac{1}{15} x^{4} + \frac{23}{1890} x^{6} - \frac{41}{37\text{,}800}x^{8} + \frac{53}{831\text{,}600} x^{10}; \end{aligned}$$

• Taking \(n=3\) in (14) gives

  $$\begin{aligned} &{-}\frac{1}{15}x^{4} + \frac{23}{1890}x^{6} - \frac{41}{37\text{,}800}x^{8} +\frac{53}{831\text{,}600}x^{10} - \frac{74\text{,}677}{27\text{,}243\text{,}216\text{,}000}x^{12} \\ &\quad < \cos x - \biggl(\frac{\sin x}{x} \biggr) ^{ 3} \\ &\quad < -\frac{1}{15} x^{4} +\frac{23}{1890} x^{6} -\frac{41}{37\text{,}800} x^{8} +\frac{53}{831\text{,}600} x^{10} \\ &\quad \quad {}-\frac{74\text{,}677}{27\text{,}243\text{,}216\text{,}000} x^{12} +\frac{989}{10\text{,}897\text{,}286\text{,}400} x^{14}; \end{aligned}$$

• Taking \(n=4\) in (14) gives

  $$\begin{aligned} &{-}\frac{x^{4}}{15} + \frac{23 x^{6}}{1890} -\frac{41x^{8}}{37\text{,}800} + \frac{53x^{10}}{831\text{,}600} -\frac{74\text{,}677x^{12}}{27\text{,}243\text{,}216\text{,}000} +\frac{989x^{14}}{10\text{,}897\text{,}286\text{,}400} \\ &\quad \quad {}- \frac{79\text{,}649x^{16}}{33\text{,}345\text{,}696\text{,}384\text{,}000} \\ &\quad < \cos x - \biggl(\frac{\sin x}{x}\biggr) ^{3} \\ &\quad < -\frac{x^{4}}{15} +\frac{23x^{6}}{1890} -\frac{41x^{8}}{37\text{,}800} + \frac{53x^{10}}{831\text{,}600} -\frac{74\text{,}677x^{12}}{27\text{,}243\text{,}216\text{,}000} +\frac{989x^{14}}{10\text{,}897\text{,}286\text{,}400} \\ &\quad \quad {}-\frac{79\text{,}649x^{16}}{33\text{,}345\text{,}696\text{,}384\text{,}000} + \frac{454\text{,}007x^{18}}{8\text{,}869\text{,}955\text{,}238\text{,}144\text{,}000} \end{aligned}$$

etc.

Proof of Theorem 1

Consider the function

Based on power series expansions (1) and (3), we have

for all \(x \in R\), where

For \(c=\pi /2\), we have

Also,

As the last inequality holds for \(k \geq 1\), the assertions of Theorem 1 immediately follow from Proposition 1. □

3.2 Refinements of the inequalities in Statement 2

We propose the following improvement and generalization of Statement 2.

Theorem 2

1. (i)

   For every \(x \in ( 0, \frac{\pi }{2}) \) and every \(n \in N\), we have

   $$ \sum_{k=2}^{2n} (-1)^{k+1} B(k) x^{2k}< \frac{\sin {x}}{x} -\frac{\cos {x} + 2}{3}< \sum_{k=2}^{2n+1}(-1)^{k+1} B(k) x^{2k}, $$

   (17)

   where

   $$ B(k) = \frac{2}{3}\frac{k - 1}{(2 k + 1)!}. $$
2. (ii)

   For every \(x \in ( 0,\frac{\pi }{2}) \) and every \(m \in N\), we have the following error estimation:

   $$ \Biggl\vert \frac{\sin {x}}{x} -\frac{ \cos {x} + 2}{3}-\sum _{k=0}^{m}{(-1)^{k+1}B(k) x^{2k}} \Biggr\vert < B(m+1) x^{2m+2}. $$

   (18)

Examples

Let \(x \in ( 0, \frac{\pi }{2}) \).

For \(n = 1\), we get Statement 2.

For \(n >1 \), we have the following new results:

• Taking \(n=2\) in (17) gives

• Taking \(n=3\) in (17) gives

  $$\begin{aligned} &{-}\frac{ x^{4}}{180} + \frac{ x^{6}}{3780} - \frac{ x^{6}}{181\text{,}440} + \frac{ x^{10}}{14\text{,}968\text{,}800} - \frac{ x^{12}}{1\text{,}868\text{,}106\text{,}240} \\ &\quad < \frac{\sin x}{x} - \frac{1}{3} \cos x - \frac{2}{3} \\ &\quad < - \frac{ x^{4}}{180} + \frac{ x^{6}}{3780} - \frac{ x^{8}}{181\text{,}440} + \frac{ x^{10}}{14\text{,}968\text{,}800} - \frac{ x^{12}}{1\text{,}868\text{,}106\text{,}240} + \frac{ x^{14}}{326\text{,}918\text{,}592\text{,}000} \end{aligned}$$

etc.

Proof of Theorem 2

Consider the function

Based on power series expansion (1), we have

The sequence \(\{ B(k) \} _{k\in N, k \geq 2}\) satisfies the recurrence relation

For \(c=\pi /2\), we have

Also,

As the last inequality holds for every \(k \geq 2\), the assertions of Theorem 2 follow from Proposition 1. □

3.3 Refinements of the inequalities in Statement 3

We propose the following improvement and generalization of Statement 3.

Theorem 3

1. (i)

   For every \(x \in ( 0, \frac{\pi }{2}) \) and every \(n \in N\), we have

   $$\begin{aligned} 3 +\frac{1}{\cos x} \sum_{k=2}^{2n+1}(-1)^{k} C(k) x^{2k} < 2 \frac{\sin {x}}{x} + \frac{\tan x}{x}< 3 +\frac{1}{\cos {x}} \sum_{k=2}^{2n}{ (-1)^{k} C(k) x^{2k}}, \end{aligned}$$

   (19)

   where

   $$\begin{aligned} C(k)= 2\frac{4^{k} - 3 k - 1}{(2k + 1)!}. \end{aligned}$$
2. (ii)

   For every \(x \in ( 0, \frac{\pi }{2}) \) and every \(m \in N\), \(m\geq 2\), we have the following error estimation:

   $$ \Biggl\vert 2 \frac{\sin {x}}{x} + \frac{\tan x}{x}- \Biggl( 3 + \frac{1}{\cos x}\sum_{k=2}^{m}{(-1)^{k+1}C(k) x^{2k}} \Biggr) \Biggr\vert < C(m+1)\frac{x^{2m+2}}{\cos x}. $$

Examples

Let \(x \in ( 0, \frac{\pi }{2}) \).

For \(n = 1\), we get Statement 3.

For \(n > 1 \), we have the following new results:

• Taking \(n=2\) in (19) gives

  $$\begin{aligned} &2 + \frac{1}{\cos x} \biggl( \frac{3}{20}x^{4} - \frac{3}{140}x^{6} + \frac{3}{2240}x^{8} - \frac{1}{19\text{,}800}x^{10}\biggr) \\ &\quad < 2 \frac{\sin x}{x} + \frac{\tan x}{x} \\ &\quad < 2 + \frac{1}{\cos x} \biggl( \frac{3}{20} x^{4} - \frac{3}{140} x^{6} + \frac{3}{2240} x^{8} \biggr) ; \end{aligned}$$

• Taking \(n=3\) in (19) gives

  $$\begin{aligned} &2 + \frac{1}{\cos x} \biggl( \frac{3}{20} x^{4} - \frac{3}{140} x^{6} + \frac{3}{2240} x^{8} - \frac{1}{19\text{,}800} x^{10} \\ &\quad \quad {}+ \frac{151}{115\text{,}315\text{,}200} x^{12} - \frac{101}{4\text{,}036\text{,}032\text{,}000} x^{14} \biggr) \\ &\quad < 2 \frac{\sin x}{x} + \frac{\tan x}{x} \\ &\quad < 2 + \frac{1}{\cos x} \biggl( \frac{3}{20} x^{4} - \frac{3}{140} x^{6} + \frac{3}{2240} x^{8} - \frac{1}{19\text{,}800} x^{10} + \frac{151}{115\text{,}315\text{,}200} x^{12} \biggr) \end{aligned}$$

etc.

Proof of Theorem 3

Consider the function

for \(x \in ( 0, \frac{\pi }{2}) \). Based on power series expansion (1), we have

for \(x \in ( 0, \frac{\pi }{2}) \). For \(c=\pi /2\), we have

Also,

As the last inequality holds for \(k \geq 2\), the assertions of Theorem 2 immediately follow from Proposition 1. □

3.4 Refinements of the inequalities in Statement 4

We propose the following improvement and generalization of Statement 4.

Theorem 4

1. (i)

   For every \(x \in ( 0, \frac{\pi }{2}) \) and every \(n \in N\), we have

   $$\begin{aligned} 2 + \frac{1}{\cos x}\sum_{k=2}^{2n+1} (-1)^{k} D(k) x^{2k} &< \biggl( \frac{ \sin {x}}{x} \biggr) ^{ 2} + \frac{\tan {x}}{x} \\ &< 2 + \frac{1}{\cos x} \sum_{k=2}^{2n}(-1)^{k} D(k) x^{2k}, \end{aligned}$$

   (20)

   where

   $$\begin{aligned} D(k) = { \frac{1}{4}}{ \frac{ - 9 + 3^{2k + 2} - 40k - 32k^{2}}{(2k + 2)!}}. \end{aligned}$$
2. (ii)

   For every \(x \in ( 0, \frac{\pi }{2}) \) and every \(m \in N, m\geq 2\), we have the following error estimation:

   $$ \Biggl\vert \biggl( \frac{\sin {x}}{x} \biggr) ^{ 2} + \frac{\tan {x}}{x} - \Biggl( 2+\frac{1}{\cos x}\sum _{k=2}^{m}{(-1)^{k+1}D(k) x^{2k}} \Biggr) \Biggr\vert < D(m+1)\frac{x^{2m+2}}{\cos x}. $$

Examples

Let \(x \in ( 0,\frac{\pi }{2}) \).

For \(n = 1\), we get Statement 4.

For \(n > 1\), we have the following new results:

• Taking \(n=2\) in (20) gives

  $$\begin{aligned} &2 +\frac{1}{\cos x} \biggl(\frac{8}{45} x^{4} - \frac{4}{105} x^{6} +\frac{19}{4725} x^{8} - \frac{37}{133\text{,}650} x^{10} \biggr) \\ &\quad < \biggl( \frac{\sin x}{x} \biggr) ^{ 2} + \frac{\tan x}{x} \\ &\quad < 2 + \frac{1}{\cos x} \biggl( \frac{8}{45} x^{4} - \frac{4}{105} x^{6} + \frac{19}{4725} x^{8} \biggr); \end{aligned}$$

• Taking \(n=3\) in (20) gives

  $$\begin{aligned} &2 +\frac{1}{\cos x} \biggl(\frac{8}{45} x^{4} - \frac{4}{105} x^{6} + \frac{19}{4725} x^{8} - \frac{37}{133\text{,}650} x^{10} \\ &\quad \quad {}+ \frac{283}{20\text{,}638\text{,}800} x^{12} - \frac{3503}{6\text{,}810\text{,}804\text{,}000} x^{14} \biggr) \\ &\quad < \biggl( \frac{\sin x}{x} \biggr) ^{ 2} + \frac{\tan x}{x} \\ &\quad < 2 + \frac{1}{\cos x} \biggl( \frac{8}{45} x^{4} - \frac{4}{105} x^{6} + \frac{19}{4725} x^{8} \\&\quad \quad {}- \frac{37}{133\text{,}650} x^{10} + \frac{283}{20\text{,}638\text{,}800} x^{12} \biggr) \end{aligned}$$

etc.

Proof of Theorem 4

Consider the function

Based on power series expansion (2), we have

For \(c=\pi /2\), we have

Also,

As the last inequality holds for \(k \geq 2\), the assertions of Theorem 2 immediately follow from Proposition 1. □

3.5 Refinements of the inequalities in Statement 5

We prove the following generalization of Statement 5.

Theorem 5

For every \(x \in ( 0, \frac{\pi }{2}) \) and \(m \in N\), \(m \ge 2\), the following inequalities hold:

where \(\boldsymbol{B}_{i}\) are Bernoulli’s numbers.

Proof of Theorem 5

Consider the function

Based on series expansion (5) and (6), we have

Since all coefficients are positive, by applying Theorem WD, we get the inequalities in the statement of the theorem. □

Examples

For \(x \in ( {0, \frac{\pi }{2} } ) \) and \(f(x) = { (\frac{x}{{\sin x}} ) ^{ 2}} + \frac{x}{{\tan x}}\), we show the inequalities for \(m = 2, 3, 4, 5\).

• For \(m=2\):

  $$\begin{aligned} 2+{ \biggl( { \frac{2}{\pi } } \biggr) ^{ 4}} \biggl( -2 + \frac{{{\pi^{2}}}}{4} \biggr) {x^{4}} > f(x) > 2+\frac{2}{{45}} {x^{4}}. \end{aligned}$$

  On the right-hand side we see the inequality from Statement 5.

• For \(m = 3\):

  $$\begin{aligned} 2+ \frac{2}{{45}} {x^{4}}+ { \biggl( {\frac{2}{\pi } } \biggr) ^{ 6}} \biggl(-2 + \frac{{{\pi^{2}}}}{4} - \frac{{{\pi^{4}}}}{{360}} \biggr) {x^{6}}> f(x) >2+ \frac{2}{{45}} {x^{4}}+ \frac{8}{{945}} {x^{6}}. \end{aligned}$$

• For \(m = 4\):

  $$\begin{aligned} &2 + \frac{2}{{45}} {x^{4}} + \frac{8}{{945}} {x^{6}} + { \biggl( \frac{2}{\pi } \biggr) ^{ 8}} \biggl( -2 + \frac{{{\pi^{2}}}}{4} - \frac{{{\pi^{4}}}}{{360}} - \frac{{{\pi^{6}}}}{{7560}} \biggr) {x^{8}} \\ &\quad >f(x)> 2 + \frac{2}{{45}} {x^{4}} + \frac{8}{{945}} {x^{6}} + \frac{2}{{1575}} {x^{8}}. \end{aligned}$$

• For \(m = 5\):

  $$\begin{aligned} &2 +\frac{2}{{45}} {x^{4}} + \frac{8}{{945}} {x^{6}} + \frac{2}{{1575}} {x^{8}} + { \biggl( \frac{2}{\pi } \biggr) ^{ 10}} \biggl( - 2 + \frac{{{\pi^{2}}}}{4} - \frac{{{\pi^{4}}}}{{360}} - \frac{{{\pi^{6}}}}{{7560}} - \frac{{{\pi^{8}}}}{{201\text{,}600}} \biggr) {x^{10}} \\ &\quad > f(x) > 2 + \frac{2}{{45}} {x^{4}} + \frac{8}{{945}} {x^{6}} + \frac{2}{{1575}} {x^{8}} + \frac{{16}}{{93\text{,}555}} {x^{10}}. \end{aligned}$$

Remark

Let us notice that Theorem WD allows for the approximation error to be estimated. The difference between the right-hand side and the left-hand side of the double inequality in Theorem 5 can be represented by the following function:

The maximum values of \(R_{n}(x)\) are reached at \(\frac{\pi }{2}\), and their values for \(n=3, 4, 5\) and 6 are \(6.97 \times 10^{-2}\), \(2.26 \times 10^{-2}\), \(6.95 \times 10^{-3}\), and \(2.06 \times 10^{-3}\), respectively.

3.6 Refinements of the inequalities in Statement 6

We propose the following generalization of Statement 6.

Theorem 6

For every \(x \in ( {0, \frac{\pi }{2}} ) \) and \(m \in N\), \(m \ge 3\), the following inequality holds:

where \(\boldsymbol{B}_{i}\) are Bernoulli’s numbers.

Proof of Theorem 6

Consider the function

Based on the series expansion (1) and (4), we have

It is easy to verify that \(3\vert {{\boldsymbol{B}_{2k}}} \vert ( {2^{2k}} - 2) > 1\) for \(k\geq 2\), and that it is equal to 1 for \(k = 1\), therefore all corresponding coefficients are positive. Now, using Theorem WD, we get the inequalities in the statement of the theorem. □

Examples

For \(x \in ( 0, \frac{\pi }{2}) \) and \(f(x)=3\frac{x}{{\sin x}} + \cos x\), we show the inequalities for \(m = 3, 4, 5, 6\).

• For \(m = 3\):

  $$\begin{aligned} 4+ \frac{1}{{10}} {x^{4}} + { \biggl( { \frac{2}{\pi } } \biggr) ^{ 6}} \biggl( - 4 + \frac{{3\pi }}{2} - \frac{{{\pi^{4}}}}{{160}} \biggr) {x^{6}} > f(x) > 4 + \frac{1}{{10}} {x^{4}} + \frac{1}{{210}} {x^{6}}. \end{aligned}$$

  On the right-hand side we see the inequality from Statement 6.

• For \(m = 4\):

  $$\begin{aligned} &4 + \frac{1}{{10}} {x^{4}} + \frac{1}{{210}} {x^{6}} + { \biggl( { \frac{2}{\pi } } \biggr) ^{ 8}} \biggl( -4 + \frac{{3\pi }}{2} - \frac{{{\pi^{4}}}}{{160}} - \frac{{{\pi^{6}}}}{{13\text{,}440}} \biggr) {x^{8}} \\ &\quad > f(x) > 4 + \frac{1}{{10}} {x^{4}} + \frac{1}{{210}} {x^{6}} + \frac{{11}}{{16\text{,}800}} {x^{8}}. \end{aligned}$$

• For \(m = 5\):

  $$\begin{aligned} &4 + \frac{1}{10} x^{4}+\frac{1}{210} x^{6} + \frac{11}{16\text{,}800} x^{8} \\ &\quad \quad {}+\biggl(\frac{2}{\pi } \biggr) ^{10} \biggl(- 4+ \frac{3\pi }{2}-\frac{\pi^{4}}{160}-\frac{\pi^{6}}{13\text{,}440}-\frac{11\pi^{8}}{4\text{,}300\text{,}800} \biggr) x^{10} \\ &\quad > f(x) > 4+\frac{1}{10} {x^{4}}+\frac{1}{210} x^{6}+\frac{11}{16\text{,}800} {x^{8}}+\frac{53}{831\text{,}600} x^{10}. \end{aligned}$$

• For \(m = 6\):

  $$\begin{aligned} &4 + \frac{x^{4}}{10} +\frac{x^{6}}{210} +\frac{11x^{8}}{16\text{,}800} + \frac{53x^{10}}{831\text{,}600} \\ &\quad \quad {}+\biggl( \frac{2}{\pi}\biggr)^{ 12} \biggl(-4 + \frac{3\pi }{2} -\frac{\pi^{4}}{160} -\frac{\pi^{6}}{13\text{,}440} -\frac{11\pi^{8}}{4\text{,}300\text{,}800} -\frac{53\pi^{10}}{851\text{,}558\text{,}400}\biggr)x^{12} \\ &\quad > f(x) > 4+\frac{x^{4}}{10}+\frac{x^{6}}{210}+\frac{11x^{8}}{16\text{,}800}+ \frac{53x^{10}}{831\text{,}600}+\frac{117\text{,}911x^{12}}{18\text{,}162\text{,}144\text{,}000} . \end{aligned}$$

Remark

The difference between the right-hand side and the left-hand side of the double inequality in Theorem 6 can be represented by the following function:

The maximum values of \(R_{n}(x)\) are reached at \(\frac{\pi }{2}\), and their values for \(n=3,4,5\), and 6 are \(3.20\times 10^{-2}\), \(7.78\times 10^{-3}\), \(1.95\times 10^{-3}\), and \(4.88\times 10^{-4}\), respectively.

The idea to compare and replace functions with their corresponding power series to get more accurate approximations was used in [9, 10], and [7]. Following the same idea, in this paper we extended the natural approach. We proposed and proved new inequalities which represent refinements and generalizations of the inequalities stated in [2], related to Wilker–Cusa–Huygens’s inequalities.

Note that proofs of the new inequalities (14), (17), (19), (20), (21), and (22) for any fixed \(n, m \in N\) can be obtained by substituting \(x = \sin t\) for \(t \in [ 0, \frac{\pi }{2}] \) and using the methods and algorithms developed in [11] and [12]. However, our approach provides proofs for the approximation of the corresponding function by the inequality of an arbitrary degree.

The results of the present research can be used to verify as well as to refine a broad category of inequalities. For example, Bercu ([13], Theorem 2.4) proved the following inequalities:

for every \(x \in (0, b)\), where \(b=\sqrt{\frac{240-6\sqrt{1090}}{17}} = 1.5701 \ldots <\frac{\pi }{2}\).

According to Theorem 5, taking \(m=7\) in (21) gives

where

Thus Bercu’s inequality is reduced to the following decidable problem (see [14, 15]): for every \(x \in ( 0, \frac{\pi }{2} ) \), it is true that

The above inequality is a refinement of the inequality obtained by Bercu. Moreover, the above inequality shows that Bercu’s inequality holds true over an extended interval \(( 0, \frac{\pi }{2}) \).

Similarly, Theorems 1, 2, 3, 4, 5, and 6 can be applied to other results and inequalities from [13, 16], as well as to a broad category of analytical inequalities.

The research of the first, second, and third authors was supported in part by the Serbian Ministry of Education, Science and Technological Development, under Projects ON 174032 & III 44006, TR 32023, and ON 174033, respectively.

Authors and Affiliations

1. School of Electrical Engineering, University of Belgrade, Belgrade, Serbia

   Branko Malešević, Tatjana Lutovac & Marija Rašajski

2. Valahia University of Târgovişte, Târgovişte, Romania

   Cristinel Mortici

3. Academy of Romanian Scientists, Bucharest, Romania

   Cristinel Mortici

4. University Politehnica of Bucharest, Bucharest, Romania

   Cristinel Mortici

Contributions

All of the authors participated in every phase of the research conducted for this paper. All authors read and approved the final manuscript.

Corresponding author

Correspondence to Branko Malešević.

Competing interests

The authors would like to state that they do not have any competing interests in the subject of this research.

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