[size=100][size=150]Which of these constructions would construct a line of reflection that takes the point [math]A[/math] to point [math]B[/math]?[/size][/size]

[size=150]A point [math]P[/math] stays in the same location when it is reflected over line [math]l[/math].[/size][br][img]data:image/png;base64,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[/img][br]What can you conclude about [math]P[/math]?

[size=150]Lines [math]\ell[/math] and [math]m[/math] are perpendicular with point of intersection [math]P[/math].[/size][br][img]data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAOQAAAERCAYAAABrfwuTAAAQ5ElEQVR4Ae2aS2gdZRiGs3UhijtBqQgKilBRrLjQVBBFECOCVBGMuBBXpisRvARRqMVLNlZcGRTxsrGKm2I1RRFBXNTiyoXGRUFEaVUQ1Gp/+QbOYc4kM5n/n//yfWeegZA5Z/7Le543T+bksuA4IAABNQQW1CQhCAQg4BCSLwIIKCKAkIrKIAoEEJKvAQgoIoCQisogCgTmSsj//vvPvfTSS+755593Tz/9NO1CwByB4kKKRDfddJP7999/B8E7e/ase+WVV9xdd91Vyfjoo48OWo/JEChBQIWQCwsLTsQccojQN9xwg/vuu+/cp59+6u67774hyzEXAkUIzIWQcnd89dVX3Z133lmJ/fDDD/OWtciXE5sOJTBYSJFhyCF3xqF3SLk7Xnvtte7QoUPu999/dxdccIH78ssvh8RiLgSKENgi5DfffOOeeuopt7q6Wt1t/vjjD/f2229Xd5wnn3zS/fLLL04kPHLkSHVXeuutt9zm5mb1XMgriCGk3B1F6h9++MG9+OKL7tZbbw3OE/IamAOBWARmhDx58qS7+OKLKwHlC/zw4cNu7969bv/+/e7jjz92i4uL7p577nEHDx6szl9//XW3vLxcyfDPP/8EZRoqpMyXnx337NnjPvroI3fFFVe4U6dOBWVhEgRKE5gR8rnnnnNvvvlmdRcUIa+88kr37bffTjOKnPK8/Elh8lb1k08+mT43HehxMlTIP//8051zzjnur7/+ctddd12V32N7hkJAFYEZIUW0d999173//vuVZC+//PI0rIhzySWXuLvvvnvmN6JHjx6txn7wwQfTsT4nQ4X86quvqv0vvfRSd+DAgek3Cp8MjIWAFgIzQk5CPfbYY9UXef3ueOLEieq5Z599djKs+uJ/4IEHqud//fXX6fM+J0OFfO2116r95WfeyV3bZ3/GQkATgS1Cym8s5Q/18jOZyDI55D9g5O3qhx9+OHmq+pufPHfHHXdUY+vjp4N2OBki5JkzZ6pfPp177rmD/7Fgh5hchkAWAtsKKZKtrKxM7zhy51laWqqE/Omnn6bB1tbWquc+++wz9/nnn1fnvnepUCFln8cff9zJ3Vx+tq1/M/DNMH1BnECgMIEtQk5+SfPOO+9Mo8kX+/nnn++uv/76mS98+ZlT5P37778rYdfX16dztjuRdZofcpeTNeRz85o8bjvkmvzP6o8//ljNn8x94403gr4xtO3D8xDISWCLkCKZ/JH9559/nuaQL3aRRv4+WT/ee+89d/vtt0+v7fT/qLKGvL288MIL3eWXX+6uvvpqd+ONN7rbbrut+i+bffv2uQcffNA99NBD0w/5U0bXIdnuv//+ai35s4x8yD8HcEDAIoEtQsrbve3E2u45ecGTO5N83umoj+17vtOakwxffPGF++2332bu4H3mMgYCmghsEVJTOLJAYGwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BI1fUQbmwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BI1fUQbmwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BI1fUQbmwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BI1fUQbmwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BI1fUQbmwEEHJsjfN6VRNASNX1EG5sBBBybI3zelUTQEjV9RBubAQQcmyN83pVE0BIRfWsr687+VhcXHS7du1yx48fd0tLS9X52tqaoqRESUUAIVORDVhX5FteXq5mrq6uut27d7vTp0+7zc3NStKAJZlijABCKipM7ooinxwrKyvV3VLOjx07NhW1GffUqVNOPjjmgwBCKulR7oRyR5wc8rZVnpND7pZtb1nvvfdet7GxMZnGZ+MEEFJJgXIXlLvi5JC75eSQt7JyfbsDIbejYvc5hFTSnfwy5/Dhw1Uaedtal3Pyc+V2URFyOyp2n0NIu91VyRHSeIGN+AjZAGLtIUJaa6w7L0J281F/FSHVV+QVECG9cOkbjJD6OhmSCCGH0FMwFyEVlBAxAkJGhFliKYQsQT3dngiZjm2WlREyC+ZsmyBkNtRpNkLINFxLrYqQpchH2hchI4FUsgxCKikiNAZChpLTOQ8hdfbSOxVC9kZlYiBCmqipPSRCtrOxeAUhLbZWy4yQNRhzcIqQxktESOMFNuIjZAOItYcIaa2x7rwI2c1H/VWEVF+RV0CE9MKlbzBC6utkSCKEHEJPwVyEVFBCxAgIGRFmiaUQsgT1dHsiZDq2WVZGyCyYs22CkNlQp9kIIdNwLbUqQpYiH2lfhIwEUskyCKmkiNAYCBlKTuc8hNTZS+9UCNkblYmBCGmipvaQCNnOxuIVhLTYWi0zQtZgzMEpQhovESGNF9iIj5ANINYeIqS1xrrzImQ3H/VXEVJ9RV4BEdILl77BCKmvkyGJEHIIPQVzEVJBCREjIGREmCWWQsgS1NPtiZDp2GZZGSGzYM62CUJmQ51mI4RMw7XUqghZinykfREyEkglyyCkkiJCYyBkKDmd8xBSZy+9UyFkb1QmBiKkiZraQyJkOxuLVxDSYmu1zAhZgzEHpwhpvESENF5gIz5CNoBYe4iQ1hrrzouQ3XzUX0VI9RV5BURIL1z6BiOkvk6GJELIIfQUzEVIBSVEjICQEWGWWAohS1BPtydCpmObZWWEzII52yYImQ11mo0QMg3XUqsiZCnykfZFyEgglSyDkEqKCI2BkKHkdM5DSJ299E6FkL1RmRiIkCZqag+JkO1sLF5BSIut1TIjZA3GHJwipPESEdJ4gY34CNkAYu0hQlprrDsvQnbzUX8VIdVX5BUQIb1w6RuMkPo6GZIIIYfQUzAXIRWUEDECQkaEWWIphCxBPd2eCJmObZaVETIL5mybIGQ21Gk2Qsg0XEutipClyEfaFyEjgVSyDEIqKSI0BkKGktM5DyF19tI7FUL2RmViIEKaqKk9JEK2s7F4BSEttlbLjJA1GHNwipDGS0RI4wU24iNkA4i1hwhprbHuvAjZzUf9VYRUX5FXQIT0wqVvMELq62RIIoQcQk/BXIRUUELECAgZEWaJpRCyBPV0eyJkOrZZVkbILJizbYKQ2VCn2Qgh03AttSpCliIfaV+EjARSyTIIqaSI0BgIGUpO5zyE1NlL71QI2RuViYEIaaKm9pAI2c7G4hWEtNhaLTNC1mDMwSlCGi8RIY0X2IiPkA0g1h4ipLXGuvMiZDcf9VcRUn1FXgER0guXvsEIqa+TIYkQcgg9BXMRUkEJESMgZESYJZZCyBLU0+2JkOnYZlkZIbNgzrYJQmZDnWYjhEzDdeiqp0+fdseOHXPy2edASB9aCscipMJSnHMrKytVsOPHj3sFREgvXGUGLy4uur1797r9+/e7zc3NmRAIOYNDxQO5M66vr1d3SN9ACOlLLPN4KXdpaanaVc537do1k0CuPfLII+6FF17o/BCZv/7665m5PEhDYHl5uXqrKn35HgjpSyzz+LW1NScfk+O8886bnFaf9+3b544ePerOnDnT+XHkyBGEnCGX7oG8oxEZfX9+lEQIma6XKCvLd9vJd1oRUx7Xj75vWUVa7pB1cunOd+/eveVHi767IWRfUoXGyVtU+flRvuuurq5u+a6LkIWKadlWfokjPYUeCBlKLsM8ecsj3227DoTsopP/mvzSbSKk729YJS1C5u+s947yVrX5FrU5GSGbRMo/FiknP2b4pkFIX2IZx8t3Wvn1edeBkF107F1DSHudzSRGyBkc5h8gpPEK5e+QGxsbO74Kfsu6IyIVAxBSRQ1hIQ4dOuQWFhbcZZdd5k6ePNm5CEJ24lFz0UvIJ554wt1yyy18KGBw8803VzKKkPJx0UUXdfZyzTXXuD179nSOodt4X9vff/99kOReQp44ccLxoYdBXcqDBw/SjaKvzyxCBinPpKQErrrqKvfMM88k3YPF8xHwukPmi8VOfQn0/S1r3/UYV5YAQpblP3h3hByMUNUCCKmqDv8wCOnPTPMMhNTcTo9sCNkDkqEhCGmorO2iIuR2VOw+h5B2u6uSI6TxAhvxEbIBxNpDhLTWWHdehOzmo/4qQqqvyCsgQnrh0jcYIfV1MiQRQg6hp2AuQiooIWIEhIwIs8RSCFmCero9ETId2ywrI2QWzNk2QchsqNNshJBpuJZaFSFLkY+0L0JGAqlkGYRUUkRoDIQMJadzHkLq7KV3KoTsjcrEQIQ0UVN7SIRsZ2PxCkJabK2WGSFrMObgFCGNl4iQxgtsxEfIBhBrDxHSWmPdeRGym4/6qwipviKvgAjphUvfYITU18mQRAg5hJ6CuQipoISIERAyIswSSyFkCerp9kTIdGyzrIyQWTBn2wQhs6FOsxFCpuFaalWELEU+0r4IGQmkkmUQUkkRoTEQMpScznkIqbOX3qkQsjcqEwMR0kRN7SERsp2NxSsIabG1WmaErMGYg1OENF4iQhovsBEfIRtArD1ESGuNdedFyG4+6q8ipPqKvAIipBcufYMRUl8nQxIh5BB6CuYipIISIkZAyIgwSyyFkCWop9sTIdOxzbIyQmbBnG0ThMyGOs1GCJmGa6lVEbIU+Uj7ImQkkEqWQUglRYTGQMhQcjrnIaTOXnqnQsjeqEwMREgTNbWHRMh2NhavIKTF1mqZEbIGYw5OEdJ4iQhpvMBGfIRsALH2ECGtNdadFyG7+ai/ipDqK/IKiJBeuPQNRkh9nQxJhJBD6CmYi5AKSogYASEjwiyxFEKWoJ5uT4RMxzbLygiZBXO2TRAyG+o0GyFkGq6lVkXIUuQj7YuQkUAqWQYhlRQRGgMhQ8npnIeQOnvpnQohe6MyMRAhTdTUHhIh29lYvIKQFlurZUbIGow5OEVI4yUipPECG/ERsgHE2kOEtNZYd16E7Oaj/ipCqq/IKyBCeuHSNxgh9XUyJBFCDqGnYC5CKighYgSEjAizxFIIWYJ6uj0RMh3bLCsjZBbM2TZByGyo02yEkGm4lloVIUuRj7QvQkYCqWQZhFRSRGgMhAwlp3MeQurspXcqhOyNysRAhDRRU3tIhGxnY/EKQlpsrZYZIWsw5uAUIY2XiJDGC2zER8gGEGsPEdJaY915EbKbj/qrCKm+Iq+ACOmFS99ghNTXyZBECDmEnoK5CKmghIgREDIizBJLIWQJ6un2RMh0bLOsjJBZMGfbBCGzoU6zEUKm4VpqVYQsRT7SvggZCaSSZRBSSRGhMRAylJzOeQips5feqRCyNyoTAxHSRE3tIRGynY3FKwhpsbVaZoSswZiDU4Q0XiJCGi+wER8hG0CsPURIa41150XIbj7qryKk+oq8AiKkFy59gxFSXydDEiHkEHoK5iKkghIiRkDIiDBLLIWQJain2xMh07HNsjJCZsGcbROEzIY6zUYImYZrqVURshT5SPsiZCSQSpZBSCVFhMZAyFByOuchpM5eeqdCyN6oTAxESBM1tYdEyHY2Fq8gpMXWapkRsgZjDk4R0niJCGm8wEZ8hGwAsfYQIa011p0XIbv5qL+KkOor8gqIkF649A0+cOCA29jY0BeMREEEEDIIG5MgkIYAQqbhyqoQCCKAkEHYmASBNAQQMg1XVoVAEAGEDMLGJAikIYCQabiyKgSCCCBkEDYmQSANAYRMw5VVIRBEACGDsDEJAmkI/A92g8sSn6ti5QAAAABJRU5ErkJggg==[/img][br]Noah says that a 180 degree rotation, with center [math]P[/math], has the same effect on points in the plane as reflecting over line [math]m[/math]. Do you agree with Noah? Explain your reasoning.

[size=150]Here are 4 triangles that have each been transformed by a different transformation. [/size][br][br]Which transformation is [i]not[/i] a rigid transformation?

[size=150]Explain how to determine whether point [math][/math]C is closer to point [math]A[/math] or point [math]B[/math].[/size]

Diego says a quadrilateral with 4 congruent sides is always a regular polygon. Mai say it never is one. Do you agree with either of them?