Sarah is the office manager for a group of financial advisors who provide financial services for individual clients. She would like to investigate whether a relationship exists between the number of presentations made to prospective clients in a month and the number of new clients per month. The following table shows the number of presentations and corresponding new clients for a random sample of six employees.
![](data:image/png;base64, /9j/4AAQSkZJRgABAQAAAQABAAD/2wBDAAMCAgMCAgMDAwMEAwMEBQgFBQQEBQoHBwYIDAoMDAsKCwsNDhIQDQ4RDgsLEBYQERMUFRUVDA8XGBYUGBIUFRT/2wBDAQMEBAUEBQkFBQkUDQsNFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBQUFBT/wAARCACOAUwDASIAAhEBAxEB/8QAHwAAAQUBAQEBAQEAAAAAAAAAAAECAwQFBgcICQoL/8QAtRAAAgEDAwIEAwUFBAQAAAF9AQIDAAQRBRIhMUEGE1FhByJxFDKBkaEII0KxwRVS0fAkM2JyggkKFhcYGRolJicoKSo0NTY3ODk6Q0RFRkdISUpTVFVWV1hZWmNkZWZnaGlqc3R1dnd4eXqDhIWGh4iJipKTlJWWl5iZmqKjpKWmp6ipqrKztLW2t7i5usLDxMXGx8jJytLT1NXW19jZ2uHi4+Tl5ufo6erx8vP09fb3+Pn6/8QAHwEAAwEBAQEBAQEBAQAAAAAAAAECAwQFBgcICQoL/8QAtREAAgECBAQDBAcFBAQAAQJ3AAECAxEEBSExBhJBUQdhcRMiMoEIFEKRobHBCSMzUvAVYnLRChYkNOEl8RcYGRomJygpKjU2Nzg5OkNERUZHSElKU1RVVldYWVpjZGVmZ2hpanN0dXZ3eHl6goOEhYaHiImKkpOUlZaXmJmaoqOkpaanqKmqsrO0tba3uLm6wsPExcbHyMnK0tPU1dbX2Nna4uPk5ebn6Onq8vP09fb3+Pn6/9oADAMBAAIRAxEAPwD9KPiF8TtA+F9npdxr0mof8TS9/s+yt9L0q71K4uJ/JlnKJBaxSSHEcErk7cAIckVyv/DS3hH/AKBHxA/8Nx4h/wDkGj4yf8lF+BP/AGOdz/6j2s14/wDAH4g+JfE/xXs/D2pfFHxxq+pWGp+J2vdO1jwvYQaRfafp2oyadEkV3HZW5afdPZTM0EkqhopkdY96gAHsH/DS3hH/AKBHxA/8Nx4h/wDkGj/hpbwj/wBAj4gf+G48Q/8AyDXP6N+1tpOr21tKfAfjize71O88PWsM2nW7tc61bSTpJp0flzuGbbazSfas/Y0VHElyjI6raf8Aaj0+fWNC0jS/AvjDXNV1my1C4tbXT7ezO25sLxbTULOWR7lY4pbeVvmkdlt5MARTSu6KwBrf8NLeEf8AoEfED/w3HiH/AOQaP+GlvCP/AECPiB/4bjxD/wDINcVp/wC0bY6p4t8N+Nf7a1jRvh1deBvEWsaxoesaWsM2mXWlX1jFO0sYiNws8Xn3cMkYd0JhXYpPzPq+IP2sLTwdbeKB4l+G/jjw/qWheH5fFH9m3cOnyNf6dBIqXcttPDePbs1vvjaSJ5Uk2yIVR9wFAHQf8NLeEf8AoEfED/w3HiH/AOQaP+GlvCP/AECPiB/4bjxD/wDINcp4/wD2yfD3wt1250jxX4T8QaBdxWWn3SSaje6Pb28sl4s7R2wnkv1iSUCyv9xlZIybNwruZLcTHiL9tz4b6B4E8I+KFuvtsPif7Z9htf7T0yzz9klEN3/pN3dw2knlTMsf7qd/M3b4vNiDSAA6v/hpbwj/ANAj4gf+G48Q/wDyDR/w0t4R/wCgR8QP/DceIf8A5Brv/CfinS/HPhXRvEmiXX23RdYsodQsbny2j86CVBJG+1wGXKsDhgCM8gGtagDyr/hpbwj/ANAj4gf+G48Q/wDyDVTU/wBqzwHotslxqFp44sLd5obZZbn4e+II1aWWRYoowWsQCzyOiKvVmZQMkgV7BXlX7S3/ACTrSP8Asc/Cf/qQ6dQAf8NLeEf+gR8QP/DceIf/AJBo/wCGlvCP/QI+IH/huPEP/wAg14/4n8X/ABB07xX8VU0jx5441fXdK8QSWPhPwzZeGrS70q5lOlafew2l/cxacWt4GnvvKMstzAfKGfNDI8o7Xxl+2Z4b8A6j4lt9b8H+MLO08O61/YWp6s9nbDTraeS3jnsme6NwIkiuRLEiu7KIWlj+1fZhIjMAdX/w0t4R/wCgR8QP/DceIf8A5Bo/4aW8I/8AQI+IH/huPEP/AMg1xVl+3T8PdY0rQn0iK41jXdZ1ObSLbQLTVdI857iJbdmRLp75bKdsXtniOC5kkJuAoTdFMIrUH7bPw/8A+E70DwjfRahoutap/Z0M1nq01la3mnXl9FDJb2c9i9wLxpf9Jt1ZoYJYkaQhpFEUxjAOr/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGsnwn+1Hp/i3yVi8C+MNPmuL3UtGtotQt7OL7Tq9l9pM2mxOLko8pSzndZw32X5ChuFlDRjA8OftbHTv2bfBHxN8deFrjQrjXYbFGgl1bR9PhuZJ7MXBuLd7vUUQQMQ4SOSUXGBlosAsADtf+GlvCP/QI+IH/AIbjxD/8g0f8NLeEf+gR8QP/AA3HiH/5BrzTxb+2DqNhc+N9Q8P+DNY13wTpngbTfF+neJrG3snVYbqO+lN3Lb3GoW0skAS2TEKrHMWhuAdoaJj6B8Rf2l9J+HFz4imn8KeKNb8PeGJobfxH4h0a2t57bRmeOGZjNCZ1uZFjt7iCeR4IJVWNyckpIqgFv/hpbwj/ANAj4gf+G48Q/wDyDR/w0t4R/wCgR8QP/DceIf8A5BqpD+0vpJ8Za34fu/CnijTU0TxBb+HNS1e5trf7Db3F0Lf7AwkSdjKty13AqiJXki3qbhLdWVieFf2mtB8c/FC+8G+HtE1jW007U5tH1HXbCSxmtNOuokuCy3UK3Ju7dTJaTwpJLbqkjquxmV0dgC3/AMNLeEf+gR8QP/DceIf/AJBo/wCGlvCP/QI+IH/huPEP/wAg16rRQB5V/wANLeEf+gR8QP8Aw3HiH/5Bo/4aW8I/9Aj4gf8AhuPEP/yDXqtFAHj9l+1Z4D1G5v7e0tPHF1cWEwtryKH4e+IHa2lMaSiOQCxyjGOWN9pwdsiHowJt/wDDS3hH/oEfED/w3HiH/wCQa8q8X6hr+lS/GK48N+J9Q8KX8nxZ8M6fJeadBaTO8F5Y+HbKZCtzBMg+S5Z1IUEOicldyt0F18RfFviHX/hHpk3iK48MeI7fxa/hnxvpOj21s9ldXCaJPqZET3EUriCQQW7xtHIkghu2WTZMMQgHa/8ADS3hH/oEfED/AMNx4h/+QaP+GlvCP/QI+IH/AIbjxD/8g1xXhP8Abl8C/EG28QN4Q0vWPF99pmmPrVrpWgT6de32qWKSRpJNDbx3ZeFlE0TeRdiCdt5VInkR0Xf1X9rDwnp+hajf21hqGtXdnounayul6Tc2FxcXn2to1Fpalbryri5jFxZs0ccjbhf2XlGU3MQcA1v+GlvCP/QI+IH/AIbjxD/8g0f8NLeEf+gR8QP/AA3HiH/5Bo8Y+Kdf8S+KvBngrTbrUPAV34h0W+1691BI7S41GwS0exQ2iK4nthK0l+m6UiZAsMioCZEmi5Tx/ovj74VaTa6unxc8QeIbSfxN4XsktdU0vSVcRz6vHaXsTyQWkYaKaG7jwAqyRvbgrJh2WgDq/wDhpbwj/wBAj4gf+G48Q/8AyDR/w0t4R/6BHxA/8Nx4h/8AkGuf8TftWaD8O9P8aX/iuC404aR4tHhaysblrGxaeU6fBeKRczXotirwvJOsk0ludpWIx+aAJTS/2udB8TSeFo/DHhLxR4ufxNpl7qGltoiWM0Mz2V0lte2xnN0IkaF3B85nFtIMCGeVnjVwDoP+GlvCP/QI+IH/AIbjxD/8g0f8NLeEf+gR8QP/AA3HiH/5BrlPGP7Vtv4b8VeDL6x0HUNa+GWteDL7xjdeJrSOFfs1nC9iRc+XLPHN5UUFy0ksYhaVvNgESuyyqva/Bj442nxrtry70/w1rGk6bFDDcW2qXdxp95Y6gryTxMLa5sbq4ikaN7d1kTeGTcmR8woAq/8ADS3hH/oEfED/AMNx4h/+QaP+GlvCP/QI+IH/AIbjxD/8g16rRQB5V/w0t4R/6BHxA/8ADceIf/kGj/hpbwj/ANAj4gf+G48Q/wDyDXqtFAHmmh/tD+D9f8TaPoEcXijTtS1iaS2sBrfg/V9MhnlSCSdoxNc2sce7yoZX2lgSEOM16XXlXxk/5KL8Cf8Asc7n/wBR7Wa9VoA8q+Mn/JRfgT/2Odz/AOo9rNVPh7+zxc/D7VdNnj+KXjjWNNstTv8AWG0W+bTYrS6urxrl52n+zWUUkimW7llEZfYriMhfkUCp+0b4T0Pxz4o+CeieJNG0/wAQaLdeM5vtGnapapc2823QNYdd8bgq2GVWGRwVB6iuV8HfBn4SeIvin4z8Ial+zt8P9Dj0SysdQsrt9G0+eW9guZ76AO8SQbYfmsHdQJHJjljLiJ98agHVaD+zFFoP/CJ4+IvjC9/4RzxNf+K4ftKaX/pN1eed9oSbZYr+6b7Xe4CbGH2uTDDZD5XAax8J7zw7+0T4R0Lw/wCLviBolpdWXivV5Nb07Q7e5t7KbUtQsbz7CbqXT5bZImkt72VRKTMCqKZMSRI3qv8Awyd8EP8Aojfw/wD/AAl7H/41R/wyd8EP+iN/D/8A8Jex/wDjVAFTWf2X/Cutarp7SahrEPh628P6n4buPDUU0RtNQtdRYPfPcTtEbt55pEikeYXAdnj3EkySmQ0H4b2PwTtofFXiHxd44+Ilxoemf2PYXGqWa6pfWtrNJb+aqR6faLNctI9vas8kqzOPJ3blBlLW/wDhk74If9Eb+H//AIS9j/8AGqP+GTvgh/0Rv4f/APhL2P8A8aoA5T4Vfs12+lfB/wAOWVwdQ8D+K4b2PXoZtLuIbi40Kf7F9ghtEaZZ4Lj7Np2zTzK8bCURGfAlfeO11X4MXOq22gXJ+IHii28WaNDdWkfiyGLTft01rcyRyTQSRNZm12lre2+ZYFcfZ0w3zSb6v/DJ3wQ/6I38P/8Awl7H/wCNUf8ADJ3wQ/6I38P/APwl7H/41QB6VpNlNp2lWVpcX9xqlxBCkUl9drGs1yyqAZHEaIgZiMkIirknCgYAt15V/wAMnfBD/ojfw/8A/CXsf/jVH/DJ3wQ/6I38P/8Awl7H/wCNUAeq15V+0t/yTrSP+xz8J/8AqQ6dR/wyd8EP+iN/D/8A8Jex/wDjVeaftB/syfB7RfAelXGn/CjwPYXD+LfDFs0tt4cs42aKXXbCKWMlYwSrxu6MvRlZgcgkUAe1+AvhivgPxN441pPEesay/izU11W4tNSFqIbSVYI7cLB5MEb7fJht48SM5xCpzuaRn58fs96fL/wn323xR4g1D/hLdatfEJ882a/2Vf2vkfZZrTZbrnyvsdlhZ/OVvsybw++XzPH/ABl8JvBvhX4iaVo6fsu/Ce48Pat4gtdD03UJktIr6+V7YXNzcR2q6c8arBFHeNtluI2f7G4UZkiD+wf8MnfBD/ojfw//APCXsf8A41QBU1/9n7VfE+lR2Op/F7xxeIYb20uhPb6JJDfWtysAeC4tm0028ir5B2sYt4E8ylir7Rb8M/s96f8AD/UbI+CfFHiDwboMP2L7R4d082dxZ3v2W3gtY/Ne6t5rgZtrW3hby5kysQYYkZ3Y/wCGTvgh/wBEb+H/AP4S9j/8ao/4ZO+CH/RG/h//AOEvY/8AxqgCp4c/ZvtPD2leG7T/AITfxRqNxoPi268YW19djTxM9xdLdC6t3EdoiGCU312SAgkUzHZIgVAtTw5+y5p/hrwr4V0SHx14wm/4RuyfRrDUftFnBeLpDpbJLpvmQW0e2Jvsdu3noFulZMpcJk1rf8MnfBD/AKI38P8A/wAJex/+NUf8MnfBD/ojfw//APCXsf8A41QBxUn7FumDwa3he1+JXjix0ifwlb+Cb5IRpLNfaXAboQRyM9gxVkjvZot8WxioQsS4Lnf1j9lzT9b1HxDNP468YLYeKrK3svFekLcWZs/EHl24tZJZka2Jt5ZrdUikaya3ysaFQjKrDW/4ZO+CH/RG/h//AOEvY/8Axqj/AIZO+CH/AERv4f8A/hL2P/xqgCpqX7N9pqlt47im8b+KA/izxBp/iZpkGnhtMvbKS2e3Nr/omCoWytIys4lysIJ+ZnZ7elfs96fb/EfTvGOseKPEHiu70e91G/0Oz1s2ciaPJemQTLbzR26XJiEcrxLDLNJGEEfykxRMh/wyd8EP+iN/D/8A8Jex/wDjVH/DJ3wQ/wCiN/D/AP8ACXsf/jVAHqtFeVf8MnfBD/ojfw//APCXsf8A41R/wyd8EP8Aojfw/wD/AAl7H/41QB6rRXlX/DJ3wQ/6I38P/wDwl7H/AONUf8MnfBD/AKI38P8A/wAJex/+NUAcVbfDFfi1r/xr0WTxHrHhlLb4jaVqq3eiC1MzS2uiaJcQKftMEybRNHFJgKCTGASVLK3pXiH4KaH4i+LHhv4hSXWoWmtaLj9xbyJ9nvdkF7BB5ysjMPKXU74r5bR5M/z7wkYXwrwh+zr8MU1/44/YPgh4H8T32n+LbWz0vTLjRbCGGFX0TSG2+Y8REMCyTSzSbFdsGVkjkkIR+r+GPwM+D3jWPxHY6z8Bfhvo3iHw5qY0rU7ax0SzvbTzWtbe7RoJ2tYnkUw3cOS0SEP5igMFDsAelfDP4SP8LvIsdP8AGPiDUPC1jZLp+l+GdQSxNnpsCbBCkUkdqly/lxoI1M00hKkly7fMMrR/2aPA+h/8I99lsNv9ia1cazB+5gHm+ZnyrSTEYzbW+yx8iMY8v+y9Pwf9GSj/AIZO+CH/AERv4f8A/hL2P/xqj/hk74If9Eb+H/8A4S9j/wDGqAOq8dfD238a/YbuHVNQ8NeINP3ix1/R/JF5apJt86ICaOSKSKQIm6OWN0LJG4USRROnFeIf2eLnxX4ZfS9W+KXji8vG1PT9TGrM2miZTZT/AGi2iWEWQtlVbgLKzrCJZCiI8jxosYt/8MnfBD/ojfw//wDCXsf/AI1R/wAMnfBD/ojfw/8A/CXsf/jVAFSX9m+0k1rxJrK+N/FEWsar4gTxNZ3yDT92jXosjYE2qm0KMrWRFuVuFm+VQ4xLmQ6ul/Bi5tPH/hbxfqHxA8Ua7qWg6Ze6UIr6LTUhvYrqVJZWnENnGd26G1AMZjAFrHwd0pkq/wDDJ3wQ/wCiN/D/AP8ACXsf/jVH/DJ3wQ/6I38P/wDwl7H/AONUAc/J+yfaQ+DfBfh/S/iR440F/Cnh+88L2er6XNp8d9Lp1wbbMTyGzIRo1s7dUliWOQbMlyxLHtfhp8GtP+HGu+JfEL6tqHiXxT4i+zLqeu6pDZw3FzHbqy28braW8ETbBJIA5QyEMFZyqRqmV/wyd8EP+iN/D/8A8Jex/wDjVH/DJ3wQ/wCiN/D/AP8ACXsf/jVAHqtFeVf8MnfBD/ojfw//APCXsf8A41R/wyd8EP8Aojfw/wD/AAl7H/41QB6rRXlX/DJ3wQ/6I38P/wDwl7H/AONUf8MnfBD/AKI38P8A/wAJex/+NUAHxk/5KL8Cf+xzuf8A1HtZr1WvnXxf8EPh18Nfi18DtT8I+AfC/hXUpfFt1bSXmiaNbWczxHw/q7GMvGikqWRDtzjKg9hX0VQB5V8ZP+Si/An/ALHO5/8AUe1mrWg+EvFVn+0N4w8U3dno6eE9U8P6XpVnPDqMr33m2k15KWktzbqiqx1CRciZiPIQ4PmkR8/+0bo154g8UfBOwsNd1DwzdzeM5tmqaXHbvcQY0DWGOwXEUsR3AFTujbhjjBwRgaZnV/GT+GLX9ob4kPqQmmtY530DR47G5uIgxmt4L1tFFvPPH5c2+GKRpE8ifco8mTaAfRVFeVf8Kb8Xf9F2+IH/AIA+Hv8A5VUf8Kb8Xf8ARdviB/4A+Hv/AJVUAeq0V5V/wpvxd/0Xb4gf+APh7/5VUf8ACm/F3/RdviB/4A+Hv/lVQB6rRXlX/Cm/F3/RdviB/wCAPh7/AOVVH/Cm/F3/AEXb4gf+APh7/wCVVAHqtFeVf8Kb8Xf9F2+IH/gD4e/+VVH/AApvxd/0Xb4gf+APh7/5VUAeq15V+0t/yTrSP+xz8J/+pDp1H/Cm/F3/AEXb4gf+APh7/wCVVeaftB/CfxRYeA9Kln+M/jjUUbxb4YiENzZ6EFVn12wRZB5emKd0bMJFBJUsihlddykA9rsvBV9dfFy/8Y6tLbtb2emDRtBtYWZmgildJr6eQ7VG6aSK1TyzvCLYo6uDPIi9rXzrqedI8ZJ4Yuv2hviQmpGaG1knTQNHksba4lCmG3nvV0U28E8nmQ7IZZFkfz4Nqnzo93a/8Kb8Xf8ARdviB/4A+Hv/AJVUAeq0V5V/wpvxd/0Xb4gf+APh7/5VUf8ACm/F3/RdviB/4A+Hv/lVQB6rRXlX/Cm/F3/RdviB/wCAPh7/AOVVH/Cm/F3/AEXb4gf+APh7/wCVVAHqtFeVf8Kb8Xf9F2+IH/gD4e/+VVH/AApvxd/0Xb4gf+APh7/5VUAeq0V5V/wpvxd/0Xb4gf8AgD4e/wDlVR/wpvxd/wBF2+IH/gD4e/8AlVQB6rRXlX/Cm/F3/RdviB/4A+Hv/lVR/wAKb8Xf9F2+IH/gD4e/+VVAHqtFeVf8Kb8Xf9F2+IH/AIA+Hv8A5VUf8Kb8Xf8ARdviB/4A+Hv/AJVUAc/4ak8VRan+0Y3gi30e68WHxbbrpya/cSw2IlPh7RQHmaJHcqoJbaoBbaF3Ju3r1XwK8N+KvB3hmfRfEeh6PpSRTS3aXem+IJdVmv7q4nluLyeffY2iRM80rSbYl2ZkYKsaqq14r4Q8Iar4V1/446pqnxx8caTZ6d4ttYZ7i30/RJZr6V9E0jy/3f8AZbmSd2ljgjigQFysSqjSMS/oHgrwtqvxB0qW/wBF+PvxIZIJjbXFtfaJolld2soVW8ue2n0dJYWKPG4WRFLJJG4yrqSAe60V5V/wpvxd/wBF2+IH/gD4e/8AlVR/wpvxd/0Xb4gf+APh7/5VUAeq0V5V/wAKb8Xf9F2+IH/gD4e/+VVH/Cm/F3/RdviB/wCAPh7/AOVVAHqtFeVf8Kb8Xf8ARdviB/4A+Hv/AJVUf8Kb8Xf9F2+IH/gD4e/+VVAHqtFeVf8ACm/F3/RdviB/4A+Hv/lVR/wpvxd/0Xb4gf8AgD4e/wDlVQB6rRXlX/Cm/F3/AEXb4gf+APh7/wCVVH/Cm/F3/RdviB/4A+Hv/lVQB6rRXlX/AApvxd/0Xb4gf+APh7/5VUf8Kb8Xf9F2+IH/AIA+Hv8A5VUAHxk/5KL8Cf8Asc7n/wBR7Wa9Vr518X+ANd8K/Fr4HXep/ErxR4xt38W3US2Ot22lRwxsfD+rkSA2llA+4BSMFyuGOVJwR9FUAeVfGT/kovwJ/wCxzuf/AFHtZrlNR+JFh4w/aC0iz1LRPGFlpXhK9mttNMng7V2t9Q1aeMW/21bpLXyY7aCGa6gDvIUlNzLIVRIIJpdX9o251y08UfBOXw3p2n6rrS+M5vs9nql+9jbyf8SDWA2+ZIZmTC7iMRtkgDgHcNb/AISP43/9E8+H/wD4Xl9/8pqAPVaK8q/4SP43/wDRPPh//wCF5ff/ACmo/wCEj+N//RPPh/8A+F5ff/KagD1WivKv+Ej+N/8A0Tz4f/8AheX3/wApqP8AhI/jf/0Tz4f/APheX3/ymoA9Voryr/hI/jf/ANE8+H//AIXl9/8AKaj/AISP43/9E8+H/wD4Xl9/8pqAPVaK8q/4SP43/wDRPPh//wCF5ff/ACmo/wCEj+N//RPPh/8A+F5ff/KagD1WvKv2lv8AknWkf9jn4T/9SHTqP+Ej+N//AETz4f8A/heX3/ymrzT9oPX/AIwy+A9KXUPAvge1tx4t8MMr23jS8mYyjXbAxIVbSUAVpAis2SVVmYK5UIwBrfF74Wza/wDEuwsPC2p+KLG81XxBofivXNOSwj/sCdbG7tWe4nvJbZnWcw6fBClvbXAYusDtEI2nmr6Kryr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApqAPVaK8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKagD1WivKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmoA9Voryr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApqAPVaK8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKagD1WivKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmoA9Voryr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApqAOf8LeMofAGv/H3XLjStY1m3g8c6dFJa6Dp8l/dhZdE0OIyLBGC7rGJPMcIGYIjkKxAB6D9nXw5qmgeFdcn1JtQuo9W1qfU7LUtfgWHW7+CRIsTagiJGqS7ldIogiGK1S0ieON43jXzT4T6/wDGFPHnxna08C+B57h/Ftu14k3jS8jWGX+wtJASNhpLGRfLEbbiEO5nXaQod/S/+Ej+N/8A0Tz4f/8AheX3/wApqAPVaK8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKagD1WivKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmoA9Voryr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApqAPVaK8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKagD1WivKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmoA9Voryr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApqAD4yf8AJRfgT/2Odz/6j2s16rXzp4v1b4jX/wAWvgdH4u8K+F9D00eLbpo7jRPEtzqUzS/8I/q+EMcun24ClS5LByQQBtOSR9F0AeVfGT/kovwJ/wCxzuf/AFHtZrirnw34d039pfwRrPh3TdHdNWm1j7f4g0S7Nzrl/exLNHNBqDlSf7LtmHlFTK3l3Z02FY4VhUNv/tG+JrPwf4o+Cer38OoXFpb+M5t8el6bcahcHdoGsKNkFvHJK/LDO1TgZJwASKvhv4qfCfwdqutanoHgLxRoepa3N9p1S8034U65bzX8u528yd008GVt0kh3MScux7mgD3WivKv+GlvCP/QI+IH/AIbjxD/8g0f8NLeEf+gR8QP/AA3HiH/5BoA9Voryr/hpbwj/ANAj4gf+G48Q/wDyDR/w0t4R/wCgR8QP/DceIf8A5BoA9Voryr/hpbwj/wBAj4gf+G48Q/8AyDR/w0t4R/6BHxA/8Nx4h/8AkGgD1WivKv8Ahpbwj/0CPiB/4bjxD/8AINH/AA0t4R/6BHxA/wDDceIf/kGgD1WvKv2lv+SdaR/2OfhP/wBSHTqP+GlvCP8A0CPiB/4bjxD/APINeaftB/tB+F9W8B6VBBpXjhHTxb4YuCbnwDrsC7Y9dsJGAaSyUFiqEKgO52KooZmVSAVfjh8PNc0D4p6b4qtNH8P63f654z8PLpniKa8ePxFo9qs9lHe6bYxC3cyWzW9tf3MwW4iURXV6WjKo7SfVVeKf8Lq+Gv8AwlX/AAk//CH+MP8AhJPsX9m/2x/wq7Xvtn2Xf5n2fzv7P3+Vv+fZnbu5xmtb/hpbwj/0CPiB/wCG48Q//INAHqtFeVf8NLeEf+gR8QP/AA3HiH/5Bo/4aW8I/wDQI+IH/huPEP8A8g0Aeq0V5V/w0t4R/wCgR8QP/DceIf8A5Bo/4aW8I/8AQI+IH/huPEP/AMg0Aeq0V5V/w0t4R/6BHxA/8Nx4h/8AkGj/AIaW8I/9Aj4gf+G48Q//ACDQB6rRXlX/AA0t4R/6BHxA/wDDceIf/kGj/hpbwj/0CPiB/wCG48Q//INAHqtFeVf8NLeEf+gR8QP/AA3HiH/5Bo/4aW8I/wDQI+IH/huPEP8A8g0Aeq0V5V/w0t4R/wCgR8QP/DceIf8A5Bo/4aW8I/8AQI+IH/huPEP/AMg0Aeaa7441bwTP8eBoVtrA1fWPHNvpVvq2j6JcaudFaTwxpTfb5baCKV5FiCHanllXlaGN2jR2lTq/2MNT06/+DN7BpaawtnZeLfEtuh1y2vYrllOtXkiF2u1EsrbJEDuxZhIJEc+YkijlPhP+0H4XsPHnxnnl0rxwyXvi23uIhD4B12VlUaFpMeJFSyJibdGx2OFYqUfG11Y9X4K+Knwn+GulS6Z4Q8BeKPCumyzG5ks9E+FOuWcLylVUyFI9PUFiqIN2M4UDsKAPdaK8q/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGgD1WivKv+GlvCP8A0CPiB/4bjxD/APINH/DS3hH/AKBHxA/8Nx4h/wDkGgD1WivKv+GlvCP/AECPiB/4bjxD/wDINH/DS3hH/oEfED/w3HiH/wCQaAPVaK8q/wCGlvCP/QI+IH/huPEP/wAg0f8ADS3hH/oEfED/AMNx4h/+QaAPVaK8q/4aW8I/9Aj4gf8AhuPEP/yDR/w0t4R/6BHxA/8ADceIf/kGgD1WivKv+GlvCP8A0CPiB/4bjxD/APINH/DS3hH/AKBHxA/8Nx4h/wDkGgA+Mn/JRfgT/wBjnc/+o9rNeq186+L/AIvaF4/+LXwO0/TLDxRa3EXi26uGfW/Ceq6VCVHh/V1IEt3bRIzZYfIGLEZIGFJH0VQB5V8ZP+Si/An/ALHO5/8AUe1muf8ACfxe8ReNv2htJs7OS3i+GeoeH9YudJeOEM2sNazaQo1FZTyIC17cxRKqhXWIzh5o54SnQfGT/kovwJ/7HO5/9R7WaydH/ZC+G/hX4y+HviN4Y0PT/Cd/otlcWUWl6FommWtnN5wKySyFbXz/ADcbQGWVdqqygBZZhIAe10UUUAFFFFABRRRQAUUUUAFeVftLf8k60j/sc/Cf/qQ6dXqteVftLf8AJOtI/wCxz8J/+pDp1ABc6x4n039prRNIn8Q/aPC2seGdWvYtEjsoo0t5LS40mNJWlIaV5Sb26yQyx7DEBGGRpJOK8J/EXxbd+MvCetXXiK4utN8TeOfEHg+Tw49tbLY2VvYDV/JuIHWIXHnt/ZMJcyzSRnz59sa5j8v1XVfhiuq/FzQPHx8R6xbXGjaZdaVHo0ItfsM0Vy8bzNJugM24vb2zZWVQPs6ADDSB8nRvgRpOi+MrbWk1nWLjTbHU7zXNN8OTNb/YdP1G7E/2m6jdYRcO0n2y8OyWaSNftL7UXZF5YB6XRRRQAUUUUAFFFFABRRRQAUUUUAFFFFAHingTTtU1fxR8f7LR9X/sG/n8Z2iLqS2y3D26HQNF8xo0f5PN2bwjOHRXKs0cqqY21v2dfF+qeMPCuuSalquoavHY61PY2Uuv2K2GtiBEiIOoWqQwrBK7M8sSiKMm1ltHdQ7vnn/C3hObxtr/AMfdJt/EGseFrh/HOnXEeraDLHHdwtDomhzAKZI5EZWMex0dGV0Z1IIY16r4K8FWPgbSpbW1luL68u5jd6jqt8yvd6jdMqq087KqgsVRFCqqpGiRxxqkcaIoB0FFFFABRRRQAUUUUAFFFFABRRRQAUUUUAeVfGT/AJKL8Cf+xzuf/Ue1mvVa8q+Mn/JRfgT/ANjnc/8AqPazXqtAHin7RvhPQ/HPij4J6J4k0bT/ABBot14zm+0adqlqlzbzbdA1h13xuCrYZVYZHBUHqK8g+FHhz4PfFX4l614btPgl8B4bfSNT1WxvLOG6s59fgis7uW0FxJpo04BFkkjjPM2AkyHLHCn3X4yf8lF+BP8A2Odz/wCo9rNVPDnw48Var4m8Nz+KdP8AC+h6b4T1O61myPhWWUnWNQuILqCW6mhkiUWist5dStCr3DNLMpM/7pvPALf/AAyd8EP+iN/D/wD8Jex/+NUf8MnfBD/ojfw//wDCXsf/AI1XqtFAHlX/AAyd8EP+iN/D/wD8Jex/+NUf8MnfBD/ojfw//wDCXsf/AI1XqtFAHlX/AAyd8EP+iN/D/wD8Jex/+NUf8MnfBD/ojfw//wDCXsf/AI1XqtFAHlX/AAyd8EP+iN/D/wD8Jex/+NUf8MnfBD/ojfw//wDCXsf/AI1XqtFAHlX/AAyd8EP+iN/D/wD8Jex/+NV5p+0H+zJ8HtF8B6Vcaf8ACjwPYXD+LfDFs0tt4cs42aKXXbCKWMlYwSrxu6MvRlZgcgkV9QV5V+0t/wAk60j/ALHPwn/6kOnUAefn4M/CSL442vgS4/Z2+H9rpV5ot7qlprcmjaeXuHtZLFJVW3WA7Yv+JggDvIrl4ZR5QTy5JDwd8GfhJ4i+KfjPwhqX7O3w/wBDj0SysdQsrt9G0+eW9guZ76AO8SQbYfmsHdQJHJjljLiJ98a+la94S8VXn7Q3g/xTaWejv4T0vw/qmlXk82oypfebdzWcoaO3FuyMqnT41yZlJ89zgeUBIaD4S8VWf7Q3jDxTd2ejp4T1Tw/pelWc8OoyvfebaTXkpaS3NuqKrHUJFyJmI8hDg+aRGAVf+GTvgh/0Rv4f/wDhL2P/AMao/wCGTvgh/wBEb+H/AP4S9j/8ar1WigDyr/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//Gq9VooA8q/4ZO+CH/RG/h//AOEvY/8Axqj/AIZO+CH/AERv4f8A/hL2P/xqvVaKAPKv+GTvgh/0Rv4f/wDhL2P/AMao/wCGTvgh/wBEb+H/AP4S9j/8ar1WigDyr/hk74If9Eb+H/8A4S9j/wDGqP8Ahk74If8ARG/h/wD+EvY//Gq9VooA8q/4ZO+CH/RG/h//AOEvY/8Axqj/AIZO+CH/AERv4f8A/hL2P/xqvVaKAPh/X/hx8HvhPp/x08SXfwe+G+qW+keOdI0qzh13TrOxsbKK70/Qoiz3BtpRbwJJeSTuQhHMhxlia9W+EPwI+D3xH8Gx6/d/Bv4LyW9zNItnc+ELez1uxuIlO0uLk2UA3CRZEKhSBs+9kkLa0PTdc1LxR8bhoOleH9eu7f4gafdtpfiRnit7jy9A0Z4ys6RymCWOZYZlk8mXmHaFQsJY/S/hj4KvvC0fiPVtZlt28Q+KNTGs6nBYszWlrKLW3tUggZlDuqQ2kKmRgpkcSSBIg4ijAOf/AOGTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPKv+GTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPKv+GTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPKv+GTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPKv+GTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPKv+GTvgh/0Rv4f/8AhL2P/wAao/4ZO+CH/RG/h/8A+EvY/wDxqvVaKAPnXxf8EPh18Nfi18DtT8I+AfC/hXUpfFt1bSXmiaNbWczxHw/q7GMvGikqWRDtzjKg9hX0VXlXxk/5KL8Cf+xzuf8A1HtZr1WgDxT9o3RrzxB4o+CdhYa7qHhm7m8ZzbNU0uO3e4gxoGsMdguIpYjuAKndG3DHGDgirZeFtV1Hxlf+FrT4+/Ei61ewhE14YdE0R7a2JCEQyXI0fyUnKSxyeQXEvlyJJs2MGPQfGT/kovwJ/wCxzuf/AFHtZrzT4N2vjXwV8S38Ppd+KLq3uvFviK+1nRdT0VI9F07S7m71C8tbuz1BbVBNPJJJYAxfap2UXVwDEhiJgAPS/wDhTfi7/ou3xA/8AfD3/wAqqP8AhTfi7/ou3xA/8AfD3/yqr1WigDyr/hTfi7/ou3xA/wDAHw9/8qqP+FN+Lv8Aou3xA/8AAHw9/wDKqvVaKAPKv+FN+Lv+i7fED/wB8Pf/ACqo/wCFN+Lv+i7fED/wB8Pf/KqvVaKAPKv+FN+Lv+i7fED/AMAfD3/yqo/4U34u/wCi7fED/wAAfD3/AMqq9VooA8q/4U34u/6Lt8QP/AHw9/8AKqvNP2g/hP4osPAelSz/ABn8caijeLfDEQhubPQgqs+u2CLIPL0xTujZhIoJKlkUMrruU/UFeVftLf8AJOtI/wCxz8J/+pDp1AHKW+mT3fxHm8BwftE/ECbxTBZSX8tnHpOhskcaGAOrTDR/KEqi6tWMJfzAlxE5XbIrGrpmdX8ZP4Ytf2hviQ+pCaa1jnfQNHjsbm4iDGa3gvW0UW888flzb4YpGkTyJ9yjyZNvVeJ79k/av+H0Y03WJbdPCWu20moQ6RdSWMMs91pkkMcl0sZhjZksbk7WcH5UBwZIw/P6j8SLDxh+0FpFnqWieMLLSvCV7NbaaZPB2rtb6hq08Yt/tq3SWvkx20EM11AHeQpKbmWQqiQQTSgHV/8ACm/F3/RdviB/4A+Hv/lVR/wpvxd/0Xb4gf8AgD4e/wDlVXqtFAHlX/Cm/F3/AEXb4gf+APh7/wCVVH/Cm/F3/RdviB/4A+Hv/lVXqtFAHlX/AApvxd/0Xb4gf+APh7/5VUf8Kb8Xf9F2+IH/AIA+Hv8A5VV6rRQB5V/wpvxd/wBF2+IH/gD4e/8AlVR/wpvxd/0Xb4gf+APh7/5VV6rRQB5V/wAKb8Xf9F2+IH/gD4e/+VVH/Cm/F3/RdviB/wCAPh7/AOVVeq0UAeVf8Kb8Xf8ARdviB/4A+Hv/AJVUf8Kb8Xf9F2+IH/gD4e/+VVeq0UAfJXhDwhqvhXX/AI46pqnxx8caTZ6d4ttYZ7i30/RJZr6V9E0jy/3f9luZJ3aWOCOKBAXKxKqNIxL+geCvC2q/EHSpb/Rfj78SGSCY21xbX2iaJZXdrKFVvLntp9HSWFijxuFkRSySRuMq6knhbxlD4A1/4+65caVrGs28HjnTopLXQdPkv7sLLomhxGRYIwXdYxJ5jhAzBEchWIAPQfs6+HNU0Dwrrk+pNqF1Hq2tT6nZalr8Cw63fwSJFibUERI1SXcrpFEEQxWqWkTxxvG8agB/wpvxd/0Xb4gf+APh7/5VUf8ACm/F3/RdviB/4A+Hv/lVXqtFAHlX/Cm/F3/RdviB/wCAPh7/AOVVH/Cm/F3/AEXb4gf+APh7/wCVVeq0UAeVf8Kb8Xf9F2+IH/gD4e/+VVH/AApvxd/0Xb4gf+APh7/5VV6rRQB5V/wpvxd/0Xb4gf8AgD4e/wDlVR/wpvxd/wBF2+IH/gD4e/8AlVXqtFAHlX/Cm/F3/RdviB/4A+Hv/lVR/wAKb8Xf9F2+IH/gD4e/+VVeq0UAeVf8Kb8Xf9F2+IH/AIA+Hv8A5VUf8Kb8Xf8ARdviB/4A+Hv/AJVV6rRQB86+L/AGu+Ffi18DrvU/iV4o8Y27+LbqJbHW7bSo4Y2Ph/VyJAbSygfcApGC5XDHKk4I+iq8q+Mn/JRfgT/2Odz/AOo9rNeq0AeafGfwl4q1+++H+s+ELPR9R1Lwx4gfVZLHW9RlsIZ4n02+syomjt5yGDXiNjyyCEIyOKq/8JH8b/8Aonnw/wD/AAvL7/5TV6rRQB5V/wAJH8b/APonnw//APC8vv8A5TUf8JH8b/8Aonnw/wD/AAvL7/5TV6rRQB5V/wAJH8b/APonnw//APC8vv8A5TUf8JH8b/8Aonnw/wD/AAvL7/5TV6rRQB5V/wAJH8b/APonnw//APC8vv8A5TUf8JH8b/8Aonnw/wD/AAvL7/5TV6rRQB5V/wAJH8b/APonnw//APC8vv8A5TUf8JH8b/8Aonnw/wD/AAvL7/5TV6rRQB5V/wAJH8b/APonnw//APC8vv8A5TVynxL0j43/ABE8OWelf8IV8P8AT/s+taTq/nf8JvfS7vsWo2975eP7HXG/7Ps3Z+Xfuw2MH6AooA8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKavVaKAPKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmr1WigDyr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApq9VooA8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKavVaKAPKv8AhI/jf/0Tz4f/APheX3/ymo/4SP43/wDRPPh//wCF5ff/ACmr1WigDyr/AISP43/9E8+H/wD4Xl9/8pqP+Ej+N/8A0Tz4f/8AheX3/wApq9VooA8q/wCEj+N//RPPh/8A+F5ff/Kaj/hI/jf/ANE8+H//AIXl9/8AKavVaKAPn/wbpHxv8JeI/Heq/wDCFfD+7/4SjWo9X8n/AITe+T7Ns06zsvLz/Y535+x792F/1m3Hy5PV/wDCR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHlX/CR/G/8A6J58P/8AwvL7/wCU1H/CR/G//onnw/8A/C8vv/lNXqtFAHilzoHxT8c/ED4dX/iTw14P8P6L4Z1qfV7ibS/FF1qNxNu0y+s1jSJ9OgX714rFjJwEPBJr2uiigD//2Q==)
Sarah would like to use simple regression analysis to estimate the number of new clients per month based on the number of presentations made by the employee per month. Which one of the following statements describes the results of the hypothesis test that the population correlation coefficient is greater than zero using
α = 0.10?
▸ Because the test statistic is greater than the critical value, we can reject the null hypothesis and conclude that the population correlation coefficient is greater than zero.
▸ Because the test statistic is greater than the critical value, we fail to reject the null hypothesis and conclude that the population correlation coefficient is greater than zero.
▸ Because the test statistic is less than the critical value, we fail to reject the null hypothesis and cannot conclude that the population correlation coefficient is greater than zero.
▸ Because the test statistic is less than the critical value, we can reject the null hypothesis and conclude that the population correlation coefficient is not greater than zero.