Maths-
General
Easy
Question
In △ABC and △PQRR AB=2 BC=5
PQ=18 QR =45.
- Two tringles are congruent
- Two triangles are similar.
- Data incomplete
- They are congreont and similar
The correct answer is: Two tringles are congruent
Two tringles are congruent
Related Questions to study
Maths-
Which point in the graph below is (-2,3)
![](data:image/png;base64,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)
For such questions, we have to check the distance of point from both the axes.
Which point in the graph below is (-2,3)
![](data:image/png;base64,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)
Maths-General
For such questions, we have to check the distance of point from both the axes.
Maths-
Complete the table:
100 |
50 |
25 |
12.5 |
300 |
150 |
x |
37.5 |
Complete the table:
100 |
50 |
25 |
12.5 |
300 |
150 |
x |
37.5 |
Maths-General
Maths-
from the graph below, identify . P
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAY0AAAFDCAYAAADGRVIVAAAPlUlEQVR4nO3dwW4b5/Xw4TMffAG+gKIwOLqAZFMkhVzYXUi6gCzErJJNAHHTBi3kTYCigDYUsujKAryJVyUXXmRpZeG4EBED3bQXQE6NoBfgO5j/wh9VMZbsI4viO6KfBxggkg3xSGb04zsznKnatm0DABL+X+kBALg5RAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNFg7T1//jz+/e9/lx4D1kLlfhqsu/v378erV6/iX//6V+lR4Maz0mCtPX/+/HSlYbUBVycarLW//vWvp//95ZdfFpwE1oNosLbmq4w5qw24OtFgbZ1dZcxZbcDVOBDO2quqKiIiPNXh6qw0AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRIPiBoNBVFV1uo3H49IjARcQDYqaB6Jt22jbNkajUfT7/WiapvBkwHmqtm3b0kPAXNM0Udd1nJycxObm5lK+ZlVVEfE6TMDVWGnQKd9++23Udb20YADLJRoUd/aYxg8//BDT6bT0SMAFRIPiHj58eHpM4+DgIKqqislkEhGxcID8fbe5Tz/9tNS3CGtDNOiU3d3d2N7ejr///e+lRwHOcav0APA2yzh4PV9tvHjx4spfCz50VhoUNRgMFt6XMZlM4vj4OD7//POCUwEXccotRc1PsT1rmafbRjjlFpZJNFh7ogHLY/cUAGmiAUCaaACQJhoApIkGAGmiAUCaaACQJhoApIkGAGmiAUCaaACQJhoApIkGAGmiAUCaaACQJhoApIkGAGmiAUCaaACQJhoApIkGAGmiAUCaaACQJhoApIkGAGmiAUCaaACX0jRNVFW1sB0eHpYeixURDSBtPB5HXdcxGo2ibdvT7cGDB7Gzs1N6PFagatu2LT0EXKeqqiIiwlP96qqqiuFwGPv7+wufn0wmcffu3Tg5OYnNzc1C07EKVhpAymQyiYiIzz777I0/29zcjLqu46efflr1WKzYrdID8OGarwDmrAS67b///W9ERPR6vXP/fGNjI16+fLnKkSjASoMiBoPBwn7xuq7tE4cbwEqDIh4+fLjw8cHBQfT7/ULTcBlN05y72phOp/H73/++wESskpXGCp13qqJX16/9/PPPUdd16TF4i9/85jcREfHPf/7zjT+bTCYxm83OPd7BehGNAk5OTk53y0ynU+GIiEePHsXW1lZExBthvcr26aefFv7O1kev14vhcBj9fv/0oHjE6xdDd+/ejb29vQuPd7A+7J4qzG6ZiMPDw5jNZm/ssqJ79vf349e//nXcvXt34fN1XcfR0VHcuXPnjdNxWS9WGhQ1Ho/jwYMHMZvNTj939k1jV91evHhR8LtbT7u7u2/8nKfTabRtG48ePYqNjY3SI3KNrDQK6/f7sbe3V3qMIsbjcfT7/Tg5ObFbY01Mp9PSI3DNRKOAs0v70WgUu7u7Bacp42wwvIMYbg67pwqYHwifH1Rsmqb0SCv3zTffRMTrgLrwHdwcrj21Qk3TRF3XC6+uNzY2Ymtry0Hga+TaU7A8VhqFHRwcxNHR0Qe52gBuHtEobH4848mTJ4UnAXg3u6dYe3ZPwfJYaQBpk8nk3Hfen32HOOtNNABIEw0A0kQDgDTRACBNNABIc8ota88pt7A8VhoApIkGAGmiAUCaaKzI4eHhue+kBbhJRAOANNEAIE00AEgTDQDSRAOANO8IZ+15Rzgsj5UGAGmiQVHj8TiqqorxeFx6FCBBNChmMBhEv98vPQZwCaJBEePxOI6OjmI2m5UeBbgE0aCI3d3daNs2er3ehX/nvMuuvM8GLI9oAJB2q/QAcJFlnSJrtQHLY6UBQJpoAJAmGgCkiQZFzN/UNz/e0O/3o6qqODw8LDwZ8DauPcXac+0pWB4rDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOAtJVF4/nz53H//v1VPRzAB+3x48fx9ddfL/3rXns05rG4f/9+PH/+/LofDoD/729/+1tUVbXceLTX5Mcff2zv3bvXRoTNZrPZOrD98Y9/vPLv9mtbabx69Spevnx5XV8egEu4fft2RMSVfy9Xbdu2yxjoIt9//318/fXXp4Ne88Ndu6qqIqKb30dXZys9V+nHf5cuzdelWSLKztO1n8VlPX78OL788su4fft2fPHFF/GHP/wh7ty5c+Wve+3RmJvH4z//+c8qHu7adPmJ1NXZSs9V+vHfpUvzdWmWCNG4iu+//z7+8Y9/LC0WcyuLxrro8hOpq7OVnqv0479Ll+br0iwRotFF3qcBQJpo8EFrmiaqqjrddnZ2So8EnSYafLCapom6rmM0GkXbttG2bRwfH8dgMCg9GnSWaPDBevLkSdR1Hbu7u6efGw6HcXR0VHAq6DbR4IP17Nmz2NraWvjcb3/724h4vQoB3iQaAKSJBgBpogFAmmjwwer1evHDDz8sfO6nn36Kuq6j1+sVmgq6TTT4YH3++ecxm81iPB6ffu7Bgwfx1VdfFZwKus1lRC6py5cW6Opsped62+OPx+Po9/unHw+Hw9jf31/ZbBHlfz5ndWmWCJcR6SLRuKQuP5G6OlvpuUo//rt0ab4uzRIhGl1k9xQAaaIBQJpoAJAmGgCkiQYAabdKD3DT/OlPfyo9AmvGc+piJX82/l3O55TbNfLnP/85IiK+/fbbwpMsKj2XUyfzSv9b0X2iwUrt7OzE8fHxSn+BiwYsj91TrMz8lzdwczkQfknj8XjhntJduzXoZDLp5D2vd3Z2Ynt7O0ajUelR+IWuPGd2dnYW5phMJkXmmDt7/3jOaEmbzWZtXdcLH0dEOxqNCk61qK7rdjabtW37v/mGw2Hhqf5nNBq1q37aRcTKH/Mm6cJzZjgcLjzmcDgs/m+2vb3d1nVdfI6usdK4hF6vF9PpdOHjuq7j559/LjjVoul0enpZ716vF3t7e/Hs2bPCU/Euh4eHxV5dd+E5s7+/v3ChyNK33Z1MJjGdTuPg4KDI43eZYxpXMB6PYzabxWeffVZ6lAs1TePeEB03PzmgK7rwnDk4OIjt7e1ic3zxxReCcQErjUs6e0yj3+/HbDYr/j/YRZqmiePj4/jd7363ssccDAad2i/ddYeHh3F8fByz2az0KBFR5jkzd/aYRkTE06dPVz5DRJzeX2V3d7fI43de6f1jN1kXjxmctb293W5vb5ceY4FjGuebP5dOTk6KztGV58z8mMb8WMsqnf13KPF87TorjQv88kyO8/at9nq9GA6H8ejRo5XPN98HPt/O3n0u4vUr/ul0WuzVGjdPl54z+/v7Udd1PHnyZKWPe3h4GNvb27G5ubnSx71JHNO4QBf+x3mbXx44PGswGMTR0VGn3sz2y/32810QXd699yHp4nOmhGfPnsXx8fEbp9lWVVXkro6dVHqpc5OMRqN2b29v4XPRsd1Te3t7ltO/EHZPvVUXnjPb29sL3/t8t1CJ3VNn2T31Jj+NS5qftz3fuhSM+S+e87bS+8pLEo13P27p58zJyckbj186GG0rGudx7SnW3k249lTTNFHXdZycnNifTqc5EA4FzU9oqOs6IiLu3r177okN0BVWGqy9m7DSgJvCSgOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNGgU+b3MYmIhfuFXGUDlsf9NOgMv+Ch+6w06ISdnZ3Y3t6O0Wh0+rn29aX7r7wByyMadMLTp087f7dEQDQAuATRACBNNFip+U2H5pubDcHN4iZMdMp4PI5+v7/UA9huwgTLY6UBQJpo0AnzN/X1+/2I+N8b+5qmKTwZcJbdU6w9u6dgeaw0AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDQDSRAOANNEAIE00AEgTDYoZDAbu4gc3jGhQxGQyiaZpom3baNs2hsNh9Pt998+AjnM/DTqjqqoYjUaxu7u79K8b4X4asAxWGnTCfIXxq1/9qvAkwNvcKj0AREQ8efIkIiI2NzdPVwbL8MknnyztawFWGnRA0zTx4MGDGI1GpUcB3kE0uHY7OzsLZ0n98mB3XdcxHA5Pj2XMD44vY3vx4kWJbxnWlmhw7Z4+fbrwi7zX653+WVVVsbe3F/v7+wUn5LLG4/HCC4GqqmIwGJQeixVwTINi5sF4+PBh6VF4T/Mz0pqmibqu486dO14ArDkrDYo4PDyMiIijo6OFV6sbGxuFJ+N99Hq9GA6H8ejRo9KjcM1EgyL29/fPPQYxnU5Lj8Z7evnyZekRWAHRAK6saZo4OjqKr776qvQoXDPHNID3dvY9Ndfxbn66RzSA9+bSLB8eu6cASBMNANJEA4A0l0Zn7bk0OiyPlQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQZwaZPJ5I3bvVZVFZPJpPRoXDPRACBNNABIEw0A0kQDgDTRACDNpdFZey6NDstjpcG1a5pm4bTMjY2N0iMB70k0uHZbW1sxm82ibdvTV/uDwaDwVMD7uFV6ANbfdDpd+Hhrayuapik0DXAVosFKNU0TR0dHMRqNSo8CvAfR4No1TRN1XZ9+PBqNYnd398K/Pz9wvQyffPLJ0r4W4JgGK9Dr9U6PZ7RtG998803s7OyUHgt4D6LB0ozH44WzpA4PD8/9e48fP47j4+MLj2ucDcxVtxcvXlzntwwfHLunWJrd3d237nYCbj5v7uNaNU0TW1tbC2dQzXdNPX36dCUzeHMfLI/dU1yrXq8XW1tbC7utIlYXDGC5rDRYe1YasDxWGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJpoAJAmGgCkiQYAaaIBQJposLY+/vjjqKrq9OOqquL+/fsFJ4KbTzRYW999990bn/vLX/5SYBJYH6LB2vroo4/io48+Ov343r17ce/evYITwc0nGqy1s6sNqwy4uqpt27b0EHCdPv7447h9+3b8+OOPpUeBG+9W6QHgun333Xfx6tWr0mPAWrDSACDNMQ0A0kQDgDTRACBNNABIEw0A0kQDgDTRACBNNABIEw0A0kQDgDTRACBNNABIEw0A0v4PLbxj7dFMgXMAAAAASUVORK5CYII=)
from the graph below, identify . P
![](data:image/png;base64,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)
Maths-General
Maths-
Find the Ver face area of rectangular pyramid of length 6cm, with 6cm and height 5cm
Find the Ver face area of rectangular pyramid of length 6cm, with 6cm and height 5cm
Maths-General
Maths-
Find the value of y: 10 - y = 7.
Find the value of y: 10 - y = 7.
Maths-General
Maths-
The area bounded by
and
-axis is
The area bounded by
and
-axis is
Maths-General
Maths-
Simplify : 2m-3 =17
Simplify : 2m-3 =17
Maths-General
Maths-
What is the valume of a triangular prism of height 16cm, base 12cm and length 10cm.
What is the valume of a triangular prism of height 16cm, base 12cm and length 10cm.
Maths-General
Maths-
find the value of m in ![fraction numerator 9 over denominator text m end text end fraction equals 3](data:image/png;base64,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)
find the value of m in ![fraction numerator 9 over denominator text m end text end fraction equals 3](data:image/png;base64,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)
Maths-General
Maths-
Solve 1.2 × 3.1
Solve 1.2 × 3.1
Maths-General
Maths-
simplify ![equals fraction numerator a squared cross times 3 to the power of 4 over denominator a 3 squared end fraction](data:image/png;base64,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)
simplify ![equals fraction numerator a squared cross times 3 to the power of 4 over denominator a 3 squared end fraction](data:image/png;base64,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)
Maths-General
Maths-
What is the mutliplicative inverse of -4/3
We just need to find the reciprocal of the given number to find a multiplicative inverse.
What is the mutliplicative inverse of -4/3
Maths-General
We just need to find the reciprocal of the given number to find a multiplicative inverse.
Maths-
Represent
in powers of prime numbers
Represent
in powers of prime numbers
Maths-General
Maths-
John wants to decorate a cake box of dimension 10 cm × 12 cm × 6 cm. He will hot paint the base and lop. Find the area he will decorate.
John wants to decorate a cake box of dimension 10 cm × 12 cm × 6 cm. He will hot paint the base and lop. Find the area he will decorate.
Maths-General
Maths-
What is prime factorization of 900
What is prime factorization of 900
Maths-General