M1 - try

تربيع
$$ \textbf{ Probe 1 } \begin{flalign*} &(a) \quad \text{احسب: } \int_{0}^{1} \frac{x^ §§V2(3,15,3)§§ - 1}{\ln x} \, \mathrm{d}x && \\ &(b) \quad \text{حل المعادلة: } \sqrt{ §§V2(3,15,3)§§ x-1}+\sqrt[ §§V2(3,15,3)§§ ]{ §§V2(2,10,2)§§ x-5}= §§V2(3,15,3)§§ && \\ &(c) \quad \text{احسب: } \frac{ §§V2(2,10,2)§§ }{5} \times \left(\frac{ §§V2(3,15,3)§§ }{4} + \frac{5}{6}\right) && \\ &(d) \quad \text{حل الناقصة: } §§V2(2,10,2)§§ x + 5 \geq §§V2(3,15,3)§§ x - §§V2(2,10,2)§§ && \\ &(e) \quad \text{احسب: } \left(\frac{ §§V2(3,15,3)§§ }{4}\right)^ §§V2(2,10,2)§§ \cdot \left(\frac{ §§V2(2,10,2)§§ }{ §§V2(3,15,3)§§ }\right)^ §§V2(3,15,3)§§ && \\ &(f) \quad \text{حل المعادلة: } \frac{ §§V2(2,10,2)§§ x}{ §§V2(3,15,3)§§ } - \frac{5}{ §§V2(2,10,2)§§ } = \frac{x+4}{6} && \\ &(g) \quad \text{احسب: } \sqrt{16} \cdot \left(\frac{ §§V2(2,10,2)§§ }{ §§V2(3,15,3)§§ }\right)^{- §§V2(2,10,2)§§ } && \\ &(h) \quad \text{حل نظام المعادلات:} \\ &\quad\quad \begin{cases} §§V2(2,10,2)§§ x - §§V2(3,15,3)§§ y = 5 \\ 4x + y = §§V2(2,10,2)§§ \end{cases} && \\ &(i) \quad \text{احسب: } \frac{5}{8} - \left(\frac{1}{ §§V2(3,15,3)§§ } - \frac{ §§V2(2,10,2)§§ }{5}\right) && \\ &(j) \quad \text{حل المعادلة: } §§V2(2,10,2)§§ ( §§V2(3,15,3)§§ x - 1) = 4x + 5 &&\\ &(a12) \quad \text{احسب: } \frac{ §§V2(3,15,3)§§ }{4} \cdot \left(\frac{5}{6} + \frac{7}{8}\right) && \\ &(b12) \quad \text{حل المعادلة: } \frac{ §§V2(2,10,2)§§ x- §§V2(3,15,3)§§ }{4} - \frac{ §§V2(3,15,3)§§ x+2}{ §§V2(2,10,2)§§ } = \frac{x+1}{ §§V2(3,15,3)§§ } && \\ &(c12) \quad \text{احسب: } \sqrt[ §§V2(3,15,3)§§ ]{\frac{ §§V2(2,10,2)§§ 7}{64}} && \\ &(d12) \quad \text{حل نظام المعادلات:} \\ &\quad\quad \begin{cases} §§V2(2,10,2)§§ x + §§V2(3,15,3)§§ y = §§V1(1,10,1)§§ 0 \\ 4x - y = 5 \end{cases} && \\ &(e12) \quad \text{احسب: } \left(\frac{5}{6}\right)^{- §§V2(2,10,2)§§ } \cdot \left(\frac{7}{10}\right)^{- §§V1(1,10,1)§§ } && \\ &(f12) \quad \text{حل الناقصة: } \frac{ §§V2(2,10,2)§§ x- §§V1(1,10,1)§§ }{ §§V2(3,15,3)§§ } > \frac{x+ §§V2(2,10,2)§§ }{4} && \\ &(g12) \quad \text{احسب: } \log_{ §§V2(2,10,2)§§ } 8 + \log_{\frac{ §§V1(1,10,1)§§ }{ §§V2(2,10,2)§§ }} 16 && \\ &(h12) \quad \text{حل المعادلة: } \sqrt{ §§V2(2,10,2)§§ x+ §§V1(1,10,1)§§ } = \sqrt{ §§V2(3,15,3)§§ x- §§V2(2,10,2)§§ } && \\ &(i12) \quad \text{احسب: } \sin\left(\frac{\pi}{4}\right) \cdot \cos\left(\frac{\pi}{6}\right) + \tan\left(\frac{\pi}{ §§V2(3,15,3)§§ }\right) && \\ &(j12) \quad \text{حل نظام المعادلات:} \\ &a1) \quad \text{احسب: } \frac{ §§V2(3,15,3)§§ }{4} \cdot \left(\frac{5}{6} + \frac{7}{8}\right) && \\ &a2) \quad \text{حل المعادلة: } \frac{ §§V2(2,10,2)§§ x- §§V2(3,15,3)§§ }{4} - \frac{ §§V2(3,15,3)§§ x+ §§V2(2,10,2)§§ }{ §§V2(2,10,2)§§ } = \frac{x+ §§V1(1,10,1)§§ }{ §§V2(3,15,3)§§ } && \\ &a3) \quad \text{احسب: } \sqrt[3]{\frac{ §§V2(2,10,2)§§ 7}{64}} && \\ &a4) \quad \text{حل نظام المعادلات:} \\ &\quad\quad \begin{cases} §§V2(2,10,2)§§ x + §§V2(3,15,3)§§ y = §§V1(1,10,1)§§ 0 \\ 4x - y = 5 \end{cases} && \\ &a5) \quad \text{احسب: } \left(\frac{5}{6}\right)^{-2} \cdot \left(\frac{7}{10}\right)^{-1} && \\ &a6) \quad \text{حل الناقصة: } \frac{ §§V2(2,10,2)§§ x+ §§V1(1,10,1)§§ }{ §§V2(3,15,3)§§ } > \frac{x- §§V2(2,10,2)§§ }{ §§V2(2,10,2)§§ } && \\ &a7) \quad \text{احسب: } \log_{2} 8 + \log_{\frac{ §§V1(1,10,1)§§ }{ §§V2(2,10,2)§§ }} 16 && \\ &a8) \quad \text{حل المعادلة: } \sqrt{ §§V2(2,10,2)§§ x+ §§V1(1,10,1)§§ } = \sqrt{ §§V2(3,15,3)§§ x- §§V2(2,10,2)§§ } && \\ &a9) \quad \text{احسب: } \sin\left(\frac{\pi}{4}\right) \cdot \cos\left(\frac{\pi}{6}\right) + \tan\left(\frac{\pi}{ §§V2(3,15,3)§§ }\right) && \\ &a10) \quad \text{حل نظام المعادلات:} \\ &\quad\quad \begin{cases} §§V2(2,10,2)§§ x - y + z = 4 \\ x + §§V2(3,15,3)§§ y - §§V2(2,10,2)§§ z = - §§V1(1,10,1)§§ \\ §§V2(3,15,3)§§ x + y + 4z = 9 \end{cases} && \\ &(b1) \quad \text{احسب: } \frac{5}{8} \cdot \left(\frac{ §§V2(3,15,3)§§ }{4} + \frac{ §§V2(2,10,2)§§ }{5}\right) && \\ &(b2) \quad \text{حل المعادلة: } §§V2(2,10,2)§§ x^2 + 5x - §§V2(3,15,3)§§ = 0 && \\ &(b3) \quad \text{احسب: } \sqrt{144} && \\ &(b4) \quad \text{حل نظام المعادلات:} \\ &\quad\quad \begin{cases} §§V2(3,15,3)§§ x - §§V2(2,10,2)§§ y = 7 \\ 5x + 4y = 11 \end{cases} && \\ &(b5) \quad \text{احسب: } \left(\frac{ §§V2(3,15,3)§§ }{5}\right)^{-2} \cdot \left(\frac{4}{7}\right)^{- §§V1(1,10,1)§§ } && \\ &(b6) \quad \text{حل الناقصة: } \frac{ §§V2(2,10,2)§§ x+ §§V1(1,10,1)§§ }{ §§V2(3,15,3)§§ } \geq \frac{x- §§V2(2,10,2)§§ }{ §§V2(2,10,2)§§ } && \\ &(b7) \quad \text{احسب: } \log_{2} §§V2(3,15,3)§§ 2 + \log_{\frac{ §§V1(1,10,1)§§ }{2}} 4 && \\ &(b8) \quad \text{حل المعادلة: } \sqrt{4x+ §§V1(1,10,1)§§ } = \sqrt{5x- §§V2(2,10,2)§§ } && \\ &(b9) \quad \text{احسب: } \sin\left(\frac{\pi}{6}\right) \cdot \cos\left(\frac{\pi}{4}\right) + \tan\left(\frac{\pi}{ §§V2(3,15,3)§§ }\right) && \\ \end{flalign*} $$
An error has occurred. This application may no longer respond until reloaded. Reload 🗙